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| :: A Projective Closure and Projective Horizon of an Affine Space | |
| :: by Henryk Oryszczyszyn and Krzysztof Pra\.zmowski | |
| environ | |
| vocabularies DIRAF, SUBSET_1, STRUCT_0, AFF_4, INCSP_1, AFF_1, ANALOAF, | |
| RELAT_1, TARSKI, PARSP_1, XBOOLE_0, ARYTM_3, SETFAM_1, ZFMISC_1, EQREL_1, | |
| RELAT_2, ANPROJ_1, INCPROJ, MCART_1, FDIFF_1, ANPROJ_2, AFF_2, VECTSP_1, | |
| AFPROJ; | |
| notations TARSKI, XBOOLE_0, ZFMISC_1, SUBSET_1, DOMAIN_1, EQREL_1, RELSET_1, | |
| RELAT_1, RELAT_2, XTUPLE_0, MCART_1, STRUCT_0, ANALOAF, DIRAF, AFF_1, | |
| AFF_4, AFF_2, PAPDESAF, INCSP_1, INCPROJ; | |
| constructors DOMAIN_1, EQREL_1, AFF_1, AFF_2, TRANSLAC, INCPROJ, AFF_4, | |
| RELSET_1, XTUPLE_0; | |
| registrations XBOOLE_0, SUBSET_1, RELSET_1, STRUCT_0, INCPROJ, XTUPLE_0; | |
| requirements SUBSET, BOOLE; | |
| definitions TARSKI; | |
| equalities TARSKI; | |
| expansions TARSKI; | |
| theorems RELAT_1, RELAT_2, TARSKI, ZFMISC_1, EQREL_1, AFF_1, AFF_4, INCPROJ, | |
| PAPDESAF, AFF_2, DIRAF, INCSP_1, XBOOLE_0, PARTFUN1, ORDERS_1, XTUPLE_0; | |
| schemes RELSET_1; | |
| begin | |
| reserve AS for AffinSpace; | |
| reserve A,K,M,X,Y,Z,X9,Y9 for Subset of AS; | |
| reserve zz for Element of AS; | |
| reserve x,y for set; | |
| :: The aim of this article is to formalize the well known construction of | |
| :: the projective closure of an affine space. We begin with some evident | |
| :: properties of planes in affine planes. | |
| theorem Th1: | |
| AS is AffinPlane & X=the carrier of AS implies X is being_plane | |
| proof | |
| assume that | |
| A1: AS is AffinPlane and | |
| A2: X=the carrier of AS; | |
| consider a,b,c being Element of AS such that | |
| A3: not LIN a,b,c by AFF_1:12; | |
| set P=Line(a,b),K=Line(a,c); | |
| A4: b in P by AFF_1:15; | |
| A5: c in K by AFF_1:15; | |
| a<>b by A3,AFF_1:7; | |
| then | |
| A6: P is being_line by AFF_1:def 3; | |
| set Y=Plane(K,P); | |
| A7: a in P by AFF_1:15; | |
| a<>c by A3,AFF_1:7; | |
| then | |
| A8: K is being_line by AFF_1:def 3; | |
| A9: a in K by AFF_1:15; | |
| A10: not K // P | |
| proof | |
| assume K // P; | |
| then c in P by A7,A9,A5,AFF_1:45; | |
| hence contradiction by A3,A7,A4,A6,AFF_1:21; | |
| end; | |
| now | |
| let x be object; | |
| assume x in X; | |
| then reconsider a=x as Element of AS; | |
| set K9=a*K; | |
| A11: K9 is being_line by A8,AFF_4:27; | |
| A12: K // K9 by A8,AFF_4:def 3; | |
| then not K9 // P by A10,AFF_1:44; | |
| then consider b being Element of AS such that | |
| A13: b in K9 and | |
| A14: b in P by A1,A6,A11,AFF_1:58; | |
| a in K9 by A8,AFF_4:def 3; | |
| then a,b // K by A12,A13,AFF_1:40; | |
| then a in {zz: ex b being Element of AS st zz,b // K & b in P} by A14; | |
| hence x in Y by AFF_4:def 1; | |
| end; | |
| then | |
| A15: X c= Y; | |
| Y is being_plane by A6,A8,A10,AFF_4:def 2; | |
| hence thesis by A2,A15,XBOOLE_0:def 10; | |
| end; | |
| theorem Th2: | |
| AS is AffinPlane & X is being_plane implies X = the carrier of AS | |
| proof | |
| assume that | |
| A1: AS is AffinPlane and | |
| A2: X is being_plane; | |
| the carrier of AS c= the carrier of AS; | |
| then reconsider Z=the carrier of AS as Subset of AS; | |
| Z is being_plane by A1,Th1; | |
| hence thesis by A2,AFF_4:33; | |
| end; | |
| theorem Th3: | |
| AS is AffinPlane & X is being_plane & Y is being_plane implies X= Y | |
| proof | |
| assume that | |
| A1: AS is AffinPlane and | |
| A2: X is being_plane and | |
| A3: Y is being_plane; | |
| X=the carrier of AS by A1,A2,Th2; | |
| hence thesis by A1,A3,Th2; | |
| end; | |
| theorem | |
| X=the carrier of AS & X is being_plane implies AS is AffinPlane | |
| proof | |
| assume that | |
| A1: X=the carrier of AS and | |
| A2: X is being_plane; | |
| assume AS is not AffinPlane; | |
| then ex zz st not zz in X by A2,AFF_4:48; | |
| hence contradiction by A1; | |
| end; | |
| theorem Th5: | |
| not A // K & A '||' X & A '||' Y & K '||' X & K '||' Y & A is | |
| being_line & K is being_line & X is being_plane & Y is being_plane implies X | |
| '||' Y | |
| proof | |
| assume that | |
| A1: not A // K and | |
| A2: A '||' X and | |
| A3: A '||' Y and | |
| A4: K '||' X and | |
| A5: K '||' Y and | |
| A6: A is being_line and | |
| A7: K is being_line and | |
| A8: X is being_plane and | |
| A9: Y is being_plane; | |
| set y = the Element of Y; | |
| set x = the Element of X; | |
| A10: Y <> {} by A9,AFF_4:59; | |
| A11: X <> {} by A8,AFF_4:59; | |
| then reconsider a=x,b=y as Element of AS by A10,TARSKI:def 3; | |
| A12: K // a*K by A7,AFF_4:def 3; | |
| A13: A // a*A by A6,AFF_4:def 3; | |
| A14: not a*A // a*K | |
| proof | |
| assume not thesis; | |
| then a*A // K by A12,AFF_1:44; | |
| hence contradiction by A1,A13,AFF_1:44; | |
| end; | |
| a*K c= a+X by A4,A7,A8,AFF_4:68; | |
| then | |
| A15: a*K c= X by A8,A11,AFF_4:66; | |
| K // b*K by A7,AFF_4:def 3; | |
| then | |
| A16: a*K // b*K by A12,AFF_1:44; | |
| b*A c= b+Y by A3,A6,A9,AFF_4:68; | |
| then | |
| A17: b*A c= Y by A9,A10,AFF_4:66; | |
| A // b*A by A6,AFF_4:def 3; | |
| then | |
| A18: a*A // b*A by A13,AFF_1:44; | |
| b*K c= b+Y by A5,A7,A9,AFF_4:68; | |
| then | |
| A19: b*K c= Y by A9,A10,AFF_4:66; | |
| a*A c= a+X by A2,A6,A8,AFF_4:68; | |
| then a*A c= X by A8,A11,AFF_4:66; | |
| hence thesis by A8,A9,A15,A17,A19,A14,A18,A16,AFF_4:55; | |
| end; | |
| theorem | |
| X is being_plane & A '||' X & X '||' Y implies A '||' Y by AFF_4:59,60; | |
| :: Next we distinguish two sets, one consisting of the lines, the second | |
| :: consisting of the planes of a given affine space and we consider two | |
| :: equivalence relations defined on each of these sets; theses relations | |
| :: are in fact the relation of parallelity restricted to suitable area. | |
| :: Their equivalence classes are called directions (of lines and planes, | |
| :: respectively); they are intended to be considered as new objects which | |
| :: extend the given affine space to a projective space. | |
| definition | |
| let AS; | |
| func AfLines(AS) -> Subset-Family of AS equals | |
| {A: A is being_line}; | |
| coherence | |
| proof | |
| set X={A: A is being_line}; | |
| X c= bool the carrier of AS | |
| proof | |
| let x be object; | |
| assume x in X; | |
| then ex A st x=A & A is being_line; | |
| hence thesis; | |
| end; | |
| hence thesis; | |
| end; | |
| end; | |
| definition | |
| let AS; | |
| func AfPlanes(AS) -> Subset-Family of AS equals | |
| {A: A is being_plane}; | |
| coherence | |
| proof | |
| set X={A: A is being_plane}; | |
| X c= bool the carrier of AS | |
| proof | |
| let x be object; | |
| assume x in X; | |
| then ex A st x=A & A is being_plane; | |
| hence thesis; | |
| end; | |
| hence thesis; | |
| end; | |
| end; | |
| theorem | |
| for x holds (x in AfLines(AS) iff ex X st x=X & X is being_line); | |
| theorem | |
| for x holds (x in AfPlanes(AS) iff ex X st x=X & X is being_plane); | |
| definition | |
| let AS; | |
| func LinesParallelity(AS) -> Equivalence_Relation of AfLines(AS) equals | |
| {[K, | |
| M]: K is being_line & M is being_line & K '||' M}; | |
| coherence | |
| proof | |
| set AFL=AfLines(AS),AFL2=[:AfLines(AS),AfLines(AS):]; | |
| set R1={[X,Y]: X is being_line & Y is being_line & X '||' Y}; | |
| now | |
| let x be object; | |
| assume x in R1; | |
| then consider X,Y such that | |
| A1: x=[X,Y] and | |
| A2: X is being_line and | |
| A3: Y is being_line and | |
| X '||' Y; | |
| A4: Y in AFL by A3; | |
| X in AFL by A2; | |
| hence x in AFL2 by A1,A4,ZFMISC_1:def 2; | |
| end; | |
| then reconsider R2=R1 as Relation of AFL,AFL by TARSKI:def 3; | |
| now | |
| let x be object; | |
| assume x in AFL; | |
| then consider X such that | |
| A5: x=X and | |
| A6: X is being_line; | |
| X // X by A6,AFF_1:41; | |
| then X '||' X by A6,AFF_4:40; | |
| hence [x,x] in R2 by A5,A6; | |
| end; | |
| then | |
| A7: R2 is_reflexive_in AFL by RELAT_2:def 1; | |
| then | |
| A8: field R2 = AFL by ORDERS_1:13; | |
| A9: X is being_line & Y is being_line implies ([X,Y] in R1 iff X '||' Y) | |
| proof | |
| assume that | |
| A10: X is being_line and | |
| A11: Y is being_line; | |
| now | |
| assume [X,Y] in R1; | |
| then consider X9,Y9 such that | |
| A12: [X,Y]=[X9,Y9] and | |
| X9 is being_line and | |
| Y9 is being_line and | |
| A13: X9 '||' Y9; | |
| X=X9 by A12,XTUPLE_0:1; | |
| hence X '||' Y by A12,A13,XTUPLE_0:1; | |
| end; | |
| hence thesis by A10,A11; | |
| end; | |
| now | |
| let x,y,z be object; | |
| assume that | |
| A14: x in AFL and | |
| A15: y in AFL and | |
| A16: z in AFL and | |
| A17: [x,y] in R2 and | |
| A18: [y,z] in R2; | |
| consider Y such that | |
| A19: y=Y and | |
| A20: Y is being_line by A15; | |
| consider Z such that | |
| A21: z=Z and | |
| A22: Z is being_line by A16; | |
| Y '||' Z by A9,A18,A19,A20,A21,A22; | |
| then | |
| A23: Y // Z by A20,A22,AFF_4:40; | |
| consider X such that | |
| A24: x=X and | |
| A25: X is being_line by A14; | |
| X '||' Y by A9,A17,A24,A25,A19,A20; | |
| then X // Y by A25,A20,AFF_4:40; | |
| then X // Z by A23,AFF_1:44; | |
| then X '||' Z by A25,A22,AFF_4:40; | |
| hence [x,z] in R2 by A24,A25,A21,A22; | |
| end; | |
| then | |
| A26: R2 is_transitive_in AFL by RELAT_2:def 8; | |
| now | |
| let x,y be object; | |
| assume that | |
| A27: x in AFL and | |
| A28: y in AFL and | |
| A29: [x,y] in R2; | |
| consider X such that | |
| A30: x=X and | |
| A31: X is being_line by A27; | |
| consider Y such that | |
| A32: y=Y and | |
| A33: Y is being_line by A28; | |
| X '||' Y by A9,A29,A30,A31,A32,A33; | |
| then X // Y by A31,A33,AFF_4:40; | |
| then Y '||' X by A31,A33,AFF_4:40; | |
| hence [y,x] in R2 by A30,A31,A32,A33; | |
| end; | |
| then | |
| A34: R2 is_symmetric_in AFL by RELAT_2:def 3; | |
| dom R2 = AFL by A7,ORDERS_1:13; | |
| hence thesis by A8,A34,A26,PARTFUN1:def 2,RELAT_2:def 11,def 16; | |
| end; | |
| end; | |
| definition | |
| let AS; | |
| func PlanesParallelity(AS) -> Equivalence_Relation of AfPlanes(AS) equals | |
| {[ | |
| X,Y]: X is being_plane & Y is being_plane & X '||' Y}; | |
| coherence | |
| proof | |
| set AFP=AfPlanes(AS),AFP2=[:AfPlanes(AS),AfPlanes(AS):]; | |
| set R1={[X,Y]: X is being_plane & Y is being_plane & X '||' Y}; | |
| now | |
| let x be object; | |
| assume x in R1; | |
| then consider X,Y such that | |
| A1: x=[X,Y] and | |
| A2: X is being_plane and | |
| A3: Y is being_plane and | |
| X '||' Y; | |
| A4: Y in AFP by A3; | |
| X in AFP by A2; | |
| hence x in AFP2 by A1,A4,ZFMISC_1:def 2; | |
| end; | |
| then reconsider R2=R1 as Relation of AFP,AFP by TARSKI:def 3; | |
| now | |
| let x be object; | |
| assume x in AFP; | |
| then consider X such that | |
| A5: x=X and | |
| A6: X is being_plane; | |
| X '||' X by A6,AFF_4:57; | |
| hence [x,x] in R2 by A5,A6; | |
| end; | |
| then | |
| A7: R2 is_reflexive_in AFP by RELAT_2:def 1; | |
| then | |
| A8: field R2 = AFP by ORDERS_1:13; | |
| A9: X is being_plane & Y is being_plane implies ([X,Y] in R1 iff X '||' Y) | |
| proof | |
| assume that | |
| A10: X is being_plane and | |
| A11: Y is being_plane; | |
| now | |
| assume [X,Y] in R1; | |
| then consider X9,Y9 such that | |
| A12: [X,Y]=[X9,Y9] and | |
| X9 is being_plane and | |
| Y9 is being_plane and | |
| A13: X9 '||' Y9; | |
| X=X9 by A12,XTUPLE_0:1; | |
| hence X '||' Y by A12,A13,XTUPLE_0:1; | |
| end; | |
| hence thesis by A10,A11; | |
| end; | |
| now | |
| let x,y,z be object; | |
| assume that | |
| A14: x in AFP and | |
| A15: y in AFP and | |
| A16: z in AFP and | |
| A17: [x,y] in R2 and | |
| A18: [y,z] in R2; | |
| consider X such that | |
| A19: x=X and | |
| A20: X is being_plane by A14; | |
| consider Y such that | |
| A21: y=Y and | |
| A22: Y is being_plane by A15; | |
| consider Z such that | |
| A23: z=Z and | |
| A24: Z is being_plane by A16; | |
| A25: Y '||' Z by A9,A18,A21,A22,A23,A24; | |
| X '||' Y by A9,A17,A19,A20,A21,A22; | |
| then X '||' Z by A20,A22,A24,A25,AFF_4:61; | |
| hence [x,z] in R2 by A19,A20,A23,A24; | |
| end; | |
| then | |
| A26: R2 is_transitive_in AFP by RELAT_2:def 8; | |
| now | |
| let x,y be object; | |
| assume that | |
| A27: x in AFP and | |
| A28: y in AFP and | |
| A29: [x,y] in R2; | |
| consider X such that | |
| A30: x=X and | |
| A31: X is being_plane by A27; | |
| consider Y such that | |
| A32: y=Y and | |
| A33: Y is being_plane by A28; | |
| X '||' Y by A9,A29,A30,A31,A32,A33; | |
| then Y '||' X by A31,A33,AFF_4:58; | |
| hence [y,x] in R2 by A30,A31,A32,A33; | |
| end; | |
| then | |
| A34: R2 is_symmetric_in AFP by RELAT_2:def 3; | |
| dom R2 = AFP by A7,ORDERS_1:13; | |
| hence thesis by A8,A34,A26,PARTFUN1:def 2,RELAT_2:def 11,def 16; | |
| end; | |
| end; | |
| definition | |
| let AS,X; | |
| func LDir(X) -> Subset of AfLines(AS) equals | |
| Class(LinesParallelity(AS),X); | |
| correctness; | |
| end; | |
| definition | |
| let AS,X; | |
| func PDir(X) -> Subset of AfPlanes(AS) equals | |
| Class(PlanesParallelity(AS),X); | |
| correctness; | |
| end; | |
| theorem Th9: | |
| X is being_line implies for x holds x in LDir(X) iff ex Y st x=Y | |
| & Y is being_line & X '||' Y | |
| proof | |
| assume | |
| A1: X is being_line; | |
| let x; | |
| A2: now | |
| assume x in LDir(X); | |
| then [x,X] in LinesParallelity(AS) by EQREL_1:19; | |
| then consider K,M such that | |
| A3: [x,X]=[K,M] and | |
| A4: K is being_line and | |
| A5: M is being_line and | |
| A6: K '||' M; | |
| take Y=K; | |
| A7: X=M by A3,XTUPLE_0:1; | |
| K // M by A4,A5,A6,AFF_4:40; | |
| hence x=Y & Y is being_line & X '||' Y by A3,A4,A5,A7,AFF_4:40,XTUPLE_0:1; | |
| end; | |
| now | |
| given Y such that | |
| A8: x=Y and | |
| A9: Y is being_line and | |
| A10: X '||' Y; | |
| X // Y by A1,A9,A10,AFF_4:40; | |
| then Y '||' X by A1,A9,AFF_4:40; | |
| then | |
| [Y,X] in {[K,M]: K is being_line & M is being_line & K '||' M} by A1,A9; | |
| hence x in LDir(X) by A8,EQREL_1:19; | |
| end; | |
| hence thesis by A2; | |
| end; | |
| theorem Th10: | |
| X is being_plane implies for x holds x in PDir(X) iff ex Y st x= | |
| Y & Y is being_plane & X '||' Y | |
| proof | |
| assume | |
| A1: X is being_plane; | |
| let x; | |
| A2: now | |
| assume x in PDir(X); | |
| then [x,X] in PlanesParallelity(AS) by EQREL_1:19; | |
| then consider K,M such that | |
| A3: [x,X]=[K,M] and | |
| A4: K is being_plane and | |
| A5: M is being_plane and | |
| A6: K '||' M; | |
| take Y=K; | |
| X=M by A3,XTUPLE_0:1; | |
| hence x=Y & Y is being_plane & X '||' Y by A3,A4,A5,A6,AFF_4:58,XTUPLE_0:1; | |
| end; | |
| now | |
| given Y such that | |
| A7: x=Y and | |
| A8: Y is being_plane and | |
| A9: X '||' Y; | |
| Y '||' X by A1,A8,A9,AFF_4:58; | |
| then [Y,X] in { [K,M]: K is being_plane & M is being_plane & K '||' M} by | |
| A1,A8; | |
| hence x in PDir(X) by A7,EQREL_1:19; | |
| end; | |
| hence thesis by A2; | |
| end; | |
| theorem Th11: | |
| X is being_line & Y is being_line implies (LDir(X)=LDir(Y) iff X // Y) | |
| proof | |
| assume that | |
| A1: X is being_line and | |
| A2: Y is being_line; | |
| A3: LDir(Y)= Class(LinesParallelity(AS),Y); | |
| A4: Y in AfLines(AS) by A2; | |
| A5: now | |
| assume LDir(X)=LDir(Y); | |
| then X in Class(LinesParallelity(AS),Y) by A4,EQREL_1:23; | |
| then ex Y9 st X=Y9 & Y9 is being_line & Y '||' Y9 by A2,A3,Th9; | |
| hence X // Y by A2,AFF_4:40; | |
| end; | |
| A6: LDir(X)=Class(LinesParallelity(AS),X); | |
| A7: X in AfLines(AS) by A1; | |
| now | |
| assume X // Y; | |
| then X '||' Y by A1,A2,AFF_4:40; | |
| then Y in Class(LinesParallelity(AS),X) by A1,A2,A6,Th9; | |
| hence LDir(X)=LDir(Y) by A7,EQREL_1:23; | |
| end; | |
| hence thesis by A5; | |
| end; | |
| theorem Th12: | |
| X is being_line & Y is being_line implies (LDir(X)=LDir(Y) iff X '||' Y) | |
| proof | |
| assume that | |
| A1: X is being_line and | |
| A2: Y is being_line; | |
| LDir(X)=LDir(Y) iff X // Y by A1,A2,Th11; | |
| hence thesis by A1,A2,AFF_4:40; | |
| end; | |
| theorem Th13: | |
| X is being_plane & Y is being_plane implies (PDir(X)=PDir(Y) iff X '||' Y) | |
| proof | |
| assume that | |
| A1: X is being_plane and | |
| A2: Y is being_plane; | |
| A3: PDir(Y)= Class(PlanesParallelity(AS),Y); | |
| A4: Y in AfPlanes(AS) by A2; | |
| A5: now | |
| assume PDir(X)=PDir(Y); | |
| then X in Class(PlanesParallelity(AS),Y) by A4,EQREL_1:23; | |
| then ex Y9 st X=Y9 & Y9 is being_plane & Y '||' Y9 by A2,A3,Th10; | |
| hence X '||' Y by A2,AFF_4:58; | |
| end; | |
| A6: PDir(X)=Class(PlanesParallelity(AS),X); | |
| A7: X in AfPlanes(AS) by A1; | |
| now | |
| assume X '||' Y; | |
| then Y in Class(PlanesParallelity(AS),X) by A1,A2,A6,Th10; | |
| hence PDir(X)=PDir(Y) by A7,EQREL_1:23; | |
| end; | |
| hence thesis by A5; | |
| end; | |
| definition | |
| let AS; | |
| func Dir_of_Lines(AS) -> non empty set equals | |
| Class LinesParallelity(AS); | |
| coherence | |
| proof | |
| consider a,b being Element of AS such that | |
| A1: a<>b by DIRAF:40; | |
| set A=Line(a,b); | |
| A is being_line by A1,AFF_1:def 3; | |
| then A in AfLines(AS); | |
| then (Class(LinesParallelity(AS),A)) in Class LinesParallelity(AS) by | |
| EQREL_1:def 3; | |
| hence thesis; | |
| end; | |
| end; | |
| definition | |
| let AS; | |
| func Dir_of_Planes(AS) -> non empty set equals | |
| Class PlanesParallelity(AS); | |
| coherence | |
| proof | |
| set a = the Element of AS; | |
| consider A such that | |
| a in A and | |
| a in A and | |
| a in A and | |
| A1: A is being_plane by AFF_4:37; | |
| A in AfPlanes(AS) by A1; | |
| then (Class(PlanesParallelity(AS),A)) in Class PlanesParallelity(AS) by | |
| EQREL_1:def 3; | |
| hence thesis; | |
| end; | |
| end; | |
| theorem Th14: | |
| for x holds x in Dir_of_Lines(AS) iff ex X st x=LDir(X) & X is being_line | |
| proof | |
| let x; | |
| A1: now | |
| assume | |
| A2: x in Dir_of_Lines(AS); | |
| then reconsider x99=x as Subset of AfLines(AS); | |
| consider x9 being object such that | |
| A3: x9 in AfLines(AS) and | |
| A4: x99=Class(LinesParallelity(AS),x9) by A2,EQREL_1:def 3; | |
| consider X such that | |
| A5: x9=X and | |
| A6: X is being_line by A3; | |
| take X; | |
| thus x=LDir(X) by A4,A5; | |
| thus X is being_line by A6; | |
| end; | |
| now | |
| given X such that | |
| A7: x=LDir(X) and | |
| A8: X is being_line; | |
| X in AfLines(AS) by A8; | |
| hence x in Dir_of_Lines(AS) by A7,EQREL_1:def 3; | |
| end; | |
| hence thesis by A1; | |
| end; | |
| theorem Th15: | |
| for x holds x in Dir_of_Planes(AS) iff ex X st x=PDir(X) & X is being_plane | |
| proof | |
| let x; | |
| A1: now | |
| assume | |
| A2: x in Dir_of_Planes(AS); | |
| then reconsider x99= x as Subset of AfPlanes(AS); | |
| consider x9 being object such that | |
| A3: x9 in AfPlanes(AS) and | |
| A4: x99=Class(PlanesParallelity(AS),x9) by A2,EQREL_1:def 3; | |
| consider X such that | |
| A5: x9=X and | |
| A6: X is being_plane by A3; | |
| take X; | |
| thus x=PDir(X) by A4,A5; | |
| thus X is being_plane by A6; | |
| end; | |
| now | |
| given X such that | |
| A7: x=PDir(X) and | |
| A8: X is being_plane; | |
| X in AfPlanes(AS) by A8; | |
| hence x in Dir_of_Planes(AS) by A7,EQREL_1:def 3; | |
| end; | |
| hence thesis by A1; | |
| end; | |
| :: The point is to guarantee that the classes of new objects consist of really | |
| :: new objects. Clearly the set of directions of lines and the set of affine | |
| :: points do not intersect. However we cannot claim, in general, that the set | |
| :: of affine lines and the set of directions of planes do not intersect; this | |
| :: is evidently true only in the case of affine planes. Therefore we have to | |
| :: modify (slightly) a construction of the set of lines of the projective | |
| :: closure of affine space, when compared with (naive) intuitions. | |
| theorem Th16: | |
| the carrier of AS misses Dir_of_Lines(AS) | |
| proof | |
| assume not thesis; | |
| then consider x being object such that | |
| A1: x in (the carrier of AS) and | |
| A2: x in Dir_of_Lines(AS) by XBOOLE_0:3; | |
| reconsider a=x as Element of AS by A1; | |
| consider X such that | |
| A3: x=LDir(X) and | |
| A4: X is being_line by A2,Th14; | |
| set A=a*X; | |
| A5: A is being_line by A4,AFF_4:27; | |
| X // A by A4,AFF_4:def 3; | |
| then X '||' A by A4,A5,AFF_4:40; | |
| then A in a by A3,A4,A5,Th9; | |
| hence contradiction by A4,AFF_4:def 3; | |
| end; | |
| theorem | |
| AS is AffinPlane implies AfLines(AS) misses Dir_of_Planes(AS) | |
| proof | |
| the carrier of AS c= the carrier of AS; | |
| then reconsider X9=the carrier of AS as Subset of AS; | |
| assume AS is AffinPlane; | |
| then | |
| A1: X9 is being_plane by Th1; | |
| assume not thesis; | |
| then consider x being object such that | |
| A2: x in AfLines(AS) and | |
| A3: x in Dir_of_Planes(AS) by XBOOLE_0:3; | |
| consider Y such that | |
| A4: x=Y and | |
| A5: Y is being_line by A2; | |
| consider X such that | |
| A6: x=PDir(X) and | |
| A7: X is being_plane by A3,Th15; | |
| consider a,b being Element of AS such that | |
| A8: a in Y and | |
| b in Y and | |
| a<>b by A5,AFF_1:19; | |
| consider Y9 such that | |
| A9: a = Y9 and | |
| A10: Y9 is being_plane and | |
| X '||' Y9 by A6,A7,A4,A8,Th10; | |
| A11: not Y9 in Y9; | |
| Y9 = X9 by A1,A10,AFF_4:33; | |
| hence contradiction by A9,A11; | |
| end; | |
| theorem Th18: | |
| for x holds (x in [:AfLines(AS),{1}:] iff ex X st x=[X,1] & X is being_line) | |
| proof | |
| let x; | |
| A1: now | |
| assume x in [:AfLines(AS),{1}:]; | |
| then consider x1,x2 being object such that | |
| A2: x1 in AfLines(AS) and | |
| A3: x2 in {1} and | |
| A4: x=[x1,x2] by ZFMISC_1:def 2; | |
| consider X such that | |
| A5: x1=X and | |
| A6: X is being_line by A2; | |
| take X; | |
| thus x=[X,1] by A3,A4,A5,TARSKI:def 1; | |
| thus X is being_line by A6; | |
| end; | |
| now | |
| given X such that | |
| A7: x=[X,1] and | |
| A8: X is being_line; | |
| X in AfLines(AS ) by A8; | |
| hence x in [:AfLines(AS),{1}:] by A7,ZFMISC_1:106; | |
| end; | |
| hence thesis by A1; | |
| end; | |
| theorem Th19: | |
| for x holds (x in [:Dir_of_Planes(AS),{2}:] iff ex X st x=[PDir( | |
| X),2] & X is being_plane) | |
| proof | |
| let x; | |
| A1: now | |
| assume x in [:Dir_of_Planes(AS),{2}:]; | |
| then consider x1,x2 being object such that | |
| A2: x1 in Dir_of_Planes(AS) and | |
| A3: x2 in {2} and | |
| A4: x=[x1,x2] by ZFMISC_1:def 2; | |
| consider X such that | |
| A5: x1=PDir(X) and | |
| A6: X is being_plane by A2,Th15; | |
| take X; | |
| thus x=[PDir(X),2] by A3,A4,A5,TARSKI:def 1; | |
| thus X is being_plane by A6; | |
| end; | |
| (ex X st x=[PDir(X),2] & X is being_plane) | |
| implies x in [:Dir_of_Planes(AS),{2}:] by Th15,ZFMISC_1:106; | |
| hence thesis by A1; | |
| end; | |
| definition | |
| let AS; | |
| func ProjectivePoints(AS) -> non empty set equals | |
| (the carrier of AS) \/ | |
| Dir_of_Lines(AS); | |
| correctness; | |
| end; | |
| definition | |
| let AS; | |
| func ProjectiveLines(AS) -> non empty set equals | |
| [:AfLines(AS),{1}:] \/ [: | |
| Dir_of_Planes(AS),{2}:]; | |
| coherence; | |
| end; | |
| definition | |
| let AS; | |
| func Proj_Inc(AS) -> Relation of ProjectivePoints(AS),ProjectiveLines(AS) | |
| means | |
| :Def11: | |
| for x,y being object | |
| holds [x,y] in it iff (ex K st K is being_line & y=[K,1] | |
| & (x in the carrier of AS & x in K or x = LDir(K))) or ex K,X st K is | |
| being_line & X is being_plane & x=LDir(K) & y=[PDir(X),2] & K '||' X; | |
| existence | |
| proof | |
| defpred P[object,object] means | |
| ((ex K st K is being_line & $2=[K,1] & ($1 in the | |
| carrier of AS & $1 in K or $1 = LDir(K))) or (ex K,X st K is being_line & X is | |
| being_plane & $1=LDir(K) & $2=[PDir(X),2] & K '||' X)); | |
| set VV1 = ProjectivePoints(AS), VV2 = ProjectiveLines(AS); | |
| consider P being Relation of VV1,VV2 such that | |
| A1: for x,y being object holds [x,y] in P iff x in VV1 & y in VV2 & P[x,y] | |
| from RELSET_1:sch 1; | |
| take P; | |
| let x,y be object; | |
| thus [x,y] in P implies (ex K st K is being_line & y=[K,1] & (x in the | |
| carrier of AS & x in K or x = LDir(K))) or ex K,X st K is being_line & X is | |
| being_plane & x=LDir(K) & y=[PDir(X),2] & K '||' X by A1; | |
| assume | |
| A2: (ex K st K is being_line & y=[K,1] & (x in the carrier of AS & x | |
| in K or x = LDir(K))) or ex K,X st K is being_line & X is being_plane & x=LDir( | |
| K) & y=[PDir(X),2] & K '||' X; | |
| x in VV1 & y in VV2 | |
| proof | |
| A3: now | |
| given K such that | |
| A4: K is being_line and | |
| A5: y=[K,1] and | |
| A6: x in the carrier of AS & x in K or x = LDir(K); | |
| A7: now | |
| assume x=LDir(K); | |
| then x in Dir_of_Lines(AS) by A4,Th14; | |
| hence x in VV1 by XBOOLE_0:def 3; | |
| end; | |
| y in [:AfLines(AS),{1}:] by A4,A5,Th18; | |
| hence thesis by A6,A7,XBOOLE_0:def 3; | |
| end; | |
| now | |
| given K,X such that | |
| A8: K is being_line and | |
| A9: X is being_plane and | |
| A10: x=LDir(K) and | |
| A11: y=[PDir(X),2] and | |
| K '||' X; | |
| x in Dir_of_Lines(AS) by A8,A10,Th14; | |
| hence x in VV1 by XBOOLE_0:def 3; | |
| y in [:Dir_of_Planes(AS),{2}:] by A9,A11,Th19; | |
| hence y in VV2 by XBOOLE_0:def 3; | |
| end; | |
| hence thesis by A2,A3; | |
| end; | |
| hence thesis by A1,A2; | |
| end; | |
| uniqueness | |
| proof | |
| let P,Q be Relation of ProjectivePoints(AS),ProjectiveLines(AS) such that | |
| A12: for x,y being object holds | |
| [x,y] in P iff (ex K st K is being_line & y=[K,1] & (x in the | |
| carrier of AS & x in K or x = LDir(K))) or ex K,X st K is being_line & X is | |
| being_plane & x=LDir(K) & y=[PDir(X),2] & K '||' X and | |
| A13: for x,y being object holds | |
| [x,y] in Q iff (ex K st K is being_line & y=[K,1] & (x in the | |
| carrier of AS & x in K or x = LDir(K))) or ex K,X st K is being_line & X is | |
| being_plane & x=LDir(K) & y=[PDir(X),2] & K '||' X; | |
| for x,y being object holds [x,y] in P iff [x,y] in Q | |
| proof | |
| let x,y be object; | |
| [x,y] in P iff (ex K st K is being_line & y=[K,1] & (x in the | |
| carrier of AS & x in K or x = LDir(K))) or ex K,X st K is being_line & X is | |
| being_plane & x=LDir(K) & y=[PDir(X),2] & K '||' X by A12; | |
| hence thesis by A13; | |
| end; | |
| hence thesis by RELAT_1:def 2; | |
| end; | |
| end; | |
| definition | |
| let AS; | |
| func Inc_of_Dir(AS) -> Relation of Dir_of_Lines(AS),Dir_of_Planes(AS) means | |
| :Def12: | |
| for x,y being object | |
| holds [x,y] in it iff ex A,X st x=LDir(A) & y=PDir(X) & A is | |
| being_line & X is being_plane & A '||' X; | |
| existence | |
| proof | |
| defpred P[object,object] means ex A,X st $1=LDir(A) & $2=PDir(X) & A is | |
| being_line & X is being_plane & A '||' X; | |
| set VV1 = Dir_of_Lines(AS), VV2 = Dir_of_Planes(AS); | |
| consider P being Relation of VV1,VV2 such that | |
| A1: for x,y being object holds [x,y] in P iff x in VV1 & y in VV2 & P[x,y] | |
| from RELSET_1:sch 1; | |
| take P; | |
| let x,y be object; | |
| thus [x,y] in P implies ex A,X st x=LDir(A) & y=PDir(X) & A is being_line | |
| & X is being_plane & A '||' X by A1; | |
| assume | |
| A2: ex A,X st x=LDir(A) & y=PDir(X) & A is being_line & X is | |
| being_plane & A '||' X; | |
| then | |
| A3: y in VV2 by Th15; | |
| x in VV1 by A2,Th14; | |
| hence thesis by A1,A2,A3; | |
| end; | |
| uniqueness | |
| proof | |
| let P,Q be Relation of Dir_of_Lines(AS),Dir_of_Planes(AS) such that | |
| A4: for x,y being object holds | |
| [x,y] in P iff ex A,X st x=LDir(A) & y=PDir(X) & A is being_line & | |
| X is being_plane & A '||' X and | |
| A5: for x,y being object holds | |
| [x,y] in Q iff ex A,X st x=LDir(A) & y=PDir(X) & A is being_line & | |
| X is being_plane & A '||' X; | |
| for x,y being object holds [x,y] in P iff [x,y] in Q | |
| proof | |
| let x,y be object; | |
| [x,y] in P iff ex A,X st x=LDir(A) & y=PDir(X) & A is being_line & | |
| X is being_plane & A '||' X by A4; | |
| hence thesis by A5; | |
| end; | |
| hence thesis by RELAT_1:def 2; | |
| end; | |
| end; | |
| definition | |
| let AS; | |
| func IncProjSp_of(AS) -> strict IncProjStr equals | |
| IncProjStr (# | |
| ProjectivePoints(AS), ProjectiveLines(AS), Proj_Inc(AS) #); | |
| correctness; | |
| end; | |
| definition | |
| let AS; | |
| func ProjHorizon(AS) -> strict IncProjStr equals | |
| IncProjStr (#Dir_of_Lines( | |
| AS), Dir_of_Planes(AS), Inc_of_Dir(AS) #); | |
| correctness; | |
| end; | |
| theorem Th20: | |
| for x holds (x is POINT of IncProjSp_of(AS) iff (x is Element of | |
| AS or ex X st x=LDir(X) & X is being_line)) | |
| proof | |
| let x; | |
| A1: now | |
| A2: now | |
| given X such that | |
| A3: x=LDir(X) and | |
| A4: X is being_line; | |
| x in Dir_of_Lines( AS ) by A3,A4,Th14; | |
| hence x is POINT of IncProjSp_of(AS) by XBOOLE_0:def 3; | |
| end; | |
| assume x is Element of AS or ex X st x=LDir(X) & X is being_line; | |
| hence x is POINT of IncProjSp_of(AS) by A2,XBOOLE_0:def 3; | |
| end; | |
| now | |
| assume | |
| A5: x is POINT of IncProjSp_of(AS); | |
| x in Dir_of_Lines(AS) implies ex X st x=LDir(X) & X is being_line by Th14; | |
| hence x is Element of AS or ex X st x=LDir(X) & X is being_line by A5, | |
| XBOOLE_0:def 3; | |
| end; | |
| hence thesis by A1; | |
| end; | |
| theorem | |
| x is Element of the Points of ProjHorizon(AS) iff ex X st x=LDir(X) & | |
| X is being_line by Th14; | |
| theorem Th22: | |
| x is Element of the Points of ProjHorizon(AS) implies x is POINT | |
| of IncProjSp_of(AS) | |
| proof | |
| assume x is Element of the Points of ProjHorizon(AS); | |
| then ex X st x=LDir(X) & X is being_line by Th14; | |
| hence thesis by Th20; | |
| end; | |
| theorem Th23: | |
| for x holds (x is LINE of IncProjSp_of(AS) iff ex X st (x=[X,1] | |
| & X is being_line or x=[PDir(X),2] & X is being_plane)) | |
| proof | |
| let x; | |
| A1: now | |
| given X such that | |
| A2: x=[X,1] & X is being_line or x=[PDir(X),2] & X is being_plane; | |
| A3: now | |
| assume that | |
| A4: x=[PDir(X),2] and | |
| A5: X is being_plane; | |
| x in [:Dir_of_Planes(AS),{2}:] by A4,A5,Th19; | |
| hence x is LINE of IncProjSp_of(AS) by XBOOLE_0:def 3; | |
| end; | |
| now | |
| assume that | |
| A6: x=[X,1] and | |
| A7: X is being_line; | |
| x in [:AfLines(AS),{1}:] by A6,A7,Th18; | |
| hence x is LINE of IncProjSp_of(AS) by XBOOLE_0:def 3; | |
| end; | |
| hence x is LINE of IncProjSp_of(AS) by A2,A3; | |
| end; | |
| now | |
| A8: x in [:Dir_of_Planes(AS),{2}:] implies ex X st x=[X,1] & X is | |
| being_line or x=[PDir(X),2] & X is being_plane by Th19; | |
| assume | |
| A9: x is LINE of IncProjSp_of(AS); | |
| x in [:AfLines(AS),{1}:] implies ex X st x=[X,1] & X is being_line or | |
| x=[PDir(X),2] & X is being_plane by Th18; | |
| hence | |
| ex X st x=[X,1] & X is being_line or x=[PDir(X),2] & X is being_plane | |
| by A9,A8,XBOOLE_0:def 3; | |
| end; | |
| hence thesis by A1; | |
| end; | |
| theorem | |
| x is Element of the Lines of ProjHorizon(AS) iff ex X st x=PDir(X) & X | |
| is being_plane by Th15; | |
| theorem Th25: | |
| x is Element of the Lines of ProjHorizon(AS) implies [x,2] is | |
| LINE of IncProjSp_of(AS) | |
| proof | |
| assume x is Element of the Lines of ProjHorizon(AS); | |
| then ex X st x=PDir(X) & X is being_plane by Th15; | |
| hence thesis by Th23; | |
| end; | |
| reserve x,y,z,t,u,w for Element of AS; | |
| reserve K,X,Y,Z,X9,Y9 for Subset of AS; | |
| reserve a,b,c,d,p,q,r,p9 for POINT of IncProjSp_of(AS); | |
| reserve A for LINE of IncProjSp_of(AS); | |
| theorem Th26: | |
| x=a & [X,1]=A implies (a on A iff X is being_line & x in X) | |
| proof | |
| assume that | |
| A1: x=a and | |
| A2: [X,1]=A; | |
| A3: now | |
| A4: now | |
| given K such that | |
| A5: K is being_line and | |
| A6: [X,1]=[K,1] and | |
| A7: x in the carrier of AS & x in K or x = LDir(K); | |
| A8: now | |
| assume x=LDir(K); | |
| then x in Dir_of_Lines(AS) by A5,Th14; | |
| then (the carrier of AS) /\ Dir_of_Lines(AS) <> {} by XBOOLE_0:def 4; | |
| then (the carrier of AS) meets Dir_of_Lines(AS) by XBOOLE_0:def 7; | |
| hence contradiction by Th16; | |
| end; | |
| X=[K,1]`1 by A6 | |
| .= K; | |
| hence X is being_line & x in X by A5,A7,A8; | |
| end; | |
| assume a on A; | |
| then | |
| A9: [a,A] in the Inc of IncProjSp_of(AS) by INCSP_1:def 1; | |
| not ex K,X9 st K is being_line & X9 is being_plane & x=LDir(K) & [X,1 | |
| ]=[PDir(X9),2] & K '||' X9 by XTUPLE_0:1; | |
| hence X is being_line & x in X by A1,A2,A9,A4,Def11; | |
| end; | |
| now | |
| assume that | |
| A10: X is being_line and | |
| A11: x in X; | |
| [x,[X,1]] in Proj_Inc(AS) by A10,A11,Def11; | |
| hence a on A by A1,A2,INCSP_1:def 1; | |
| end; | |
| hence thesis by A3; | |
| end; | |
| theorem Th27: | |
| x=a & [PDir(X),2]=A implies not a on A | |
| proof | |
| assume that | |
| A1: x=a and | |
| A2: [PDir(X),2]=A; | |
| A3: now | |
| given K such that | |
| K is being_line and | |
| A4: [PDir(X),2]=[K,1] and | |
| x in the carrier of AS & x in K or x = LDir(K); | |
| 2 = [K,1]`2 by A4 | |
| .= 1; | |
| hence contradiction; | |
| end; | |
| A5: now | |
| given K,X9 such that | |
| A6: K is being_line and | |
| X9 is being_plane and | |
| A7: x=LDir(K) and | |
| [PDir(X),2]=[PDir(X9),2] and | |
| K '||' X9; | |
| x in Dir_of_Lines(AS) by A6,A7,Th14; | |
| then (the carrier of AS) /\ Dir_of_Lines(AS) <> {} by XBOOLE_0:def 4; | |
| then (the carrier of AS) meets Dir_of_Lines(AS) by XBOOLE_0:def 7; | |
| hence contradiction by Th16; | |
| end; | |
| assume a on A; | |
| then [a,A] in the Inc of IncProjSp_of(AS) by INCSP_1:def 1; | |
| hence contradiction by A1,A2,A3,A5,Def11; | |
| end; | |
| theorem Th28: | |
| a=LDir(Y) & [X,1]=A & Y is being_line & X is being_line implies | |
| (a on A iff Y '||' X) | |
| proof | |
| assume that | |
| A1: a=LDir(Y) and | |
| A2: [X,1]=A and | |
| A3: Y is being_line and | |
| A4: X is being_line; | |
| A5: now | |
| A6: now | |
| given K such that | |
| A7: K is being_line and | |
| A8: [X,1]=[K,1] and | |
| A9: LDir(Y) in the carrier of AS & LDir(Y) in K or LDir(Y) = LDir(K ); | |
| A10: K in AfLines(AS) by A7; | |
| A11: X=K by A8,XTUPLE_0:1; | |
| A12: now | |
| assume LDir(Y)=LDir(K); | |
| then | |
| A13: Y in Class(LinesParallelity(AS),K) by A10,EQREL_1:23; | |
| LDir(K)=Class(LinesParallelity(AS),K); | |
| then consider K9 being Subset of AS such that | |
| A14: Y=K9 and | |
| A15: K9 is being_line and | |
| A16: K '||' K9 by A7,A13,Th9; | |
| K // K9 by A7,A15,A16,AFF_4:40; | |
| hence Y '||' X by A7,A11,A14,A15,AFF_4:40; | |
| end; | |
| now | |
| assume that | |
| A17: LDir(Y) in the carrier of AS and | |
| LDir(Y) in K; | |
| a in Dir_of_Lines(AS) by A1,A3,Th14; | |
| then (the carrier of AS) /\ Dir_of_Lines(AS) <> {} by A1,A17, | |
| XBOOLE_0:def 4; | |
| then (the carrier of AS) meets Dir_of_Lines(AS) by XBOOLE_0:def 7; | |
| hence contradiction by Th16; | |
| end; | |
| hence Y '||' X by A9,A12; | |
| end; | |
| assume a on A; | |
| then | |
| A18: [a,A] in the Inc of IncProjSp_of(AS) by INCSP_1:def 1; | |
| not ex K,X9 st K is being_line & X9 is being_plane & LDir(Y)=LDir(K) | |
| & [X,1]=[PDir(X9),2] & K '||' X9 by XTUPLE_0:1; | |
| hence Y '||' X by A1,A2,A18,A6,Def11; | |
| end; | |
| now | |
| assume Y '||' X; | |
| then | |
| A19: X in LDir(Y) by A3,A4,Th9; | |
| A20: LDir(X)=Class(LinesParallelity(AS),X); | |
| Y in AfLines(AS) by A3; | |
| then Class(LinesParallelity(AS),X)=Class(LinesParallelity(AS),Y) by A19, | |
| EQREL_1:23; | |
| then [a,A] in Proj_Inc(AS) by A1,A2,A4,A20,Def11; | |
| hence a on A by INCSP_1:def 1; | |
| end; | |
| hence thesis by A5; | |
| end; | |
| theorem Th29: | |
| a=LDir(Y) & A=[PDir(X),2] & Y is being_line & X is being_plane | |
| implies (a on A iff Y '||' X) | |
| proof | |
| assume that | |
| A1: a=LDir(Y) and | |
| A2: A=[PDir(X),2] and | |
| A3: Y is being_line and | |
| A4: X is being_plane; | |
| A5: now | |
| A6: now | |
| given K,X9 such that | |
| A7: K is being_line and | |
| A8: X9 is being_plane and | |
| A9: LDir(Y)=LDir(K) and | |
| A10: [PDir(X),2]=[PDir(X9),2] and | |
| A11: K '||' X9; | |
| A12: X9 in AfPlanes(AS) by A8; | |
| A13: Class(PlanesParallelity(AS),X9)= PDir(X9); | |
| PDir(X)=PDir(X9) by A10,XTUPLE_0:1; | |
| then X in Class(PlanesParallelity(AS),X9) by A12,EQREL_1:23; | |
| then | |
| A14: ex X99 being Subset of AS st X=X99 & X99 is being_plane & X9 '||' | |
| X99 by A8,A13,Th10; | |
| K in AfLines(AS) by A7; | |
| then | |
| A15: Y in Class(LinesParallelity(AS),K) by A9,EQREL_1:23; | |
| Class(LinesParallelity(AS),K)= LDir(K); | |
| then consider K9 being Subset of AS such that | |
| A16: Y=K9 and | |
| A17: K9 is being_line and | |
| A18: K '||' K9 by A7,A15,Th9; | |
| K // K9 by A7,A17,A18,AFF_4:40; | |
| then K9 '||' X9 by A11,AFF_4:56; | |
| hence Y '||' X by A8,A16,A14,AFF_4:59,60; | |
| end; | |
| assume a on A; | |
| then | |
| A19: [a,A] in the Inc of IncProjSp_of(AS) by INCSP_1:def 1; | |
| (ex K st K is being_line & [PDir(X),2]=[K,1] & (LDir(Y) in the carrier | |
| of AS & LDir(Y) in K or LDir(Y) = LDir(K))) implies contradiction by XTUPLE_0:1 | |
| ; | |
| hence Y '||' X by A1,A2,A19,A6,Def11; | |
| end; | |
| now | |
| assume Y '||' X; | |
| then [LDir(Y),[PDir(X),2]] in Proj_Inc(AS) by A3,A4,Def11; | |
| hence a on A by A1,A2,INCSP_1:def 1; | |
| end; | |
| hence thesis by A5; | |
| end; | |
| theorem Th30: | |
| X is being_line & a=LDir(X) & A=[X,1] implies a on A | |
| proof | |
| assume that | |
| A1: X is being_line and | |
| A2: a=LDir(X) and | |
| A3: A=[X,1]; | |
| X // X by A1,AFF_1:41; | |
| then X '||' X by A1,AFF_4:40; | |
| hence thesis by A1,A2,A3,Th28; | |
| end; | |
| theorem Th31: | |
| X is being_line & Y is being_plane & X c= Y & a=LDir(X) & A=[ | |
| PDir(Y),2] implies a on A | |
| proof | |
| assume that | |
| A1: X is being_line and | |
| A2: Y is being_plane and | |
| A3: X c= Y and | |
| A4: a=LDir(X) and | |
| A5: A=[PDir(Y),2]; | |
| X '||' Y by A1,A2,A3,AFF_4:42; | |
| hence thesis by A1,A2,A4,A5,Th29; | |
| end; | |
| theorem Th32: | |
| Y is being_plane & X c= Y & X9 // X & a=LDir(X9) & A=[PDir(Y),2] | |
| implies a on A | |
| proof | |
| assume that | |
| A1: Y is being_plane and | |
| A2: X c= Y and | |
| A3: X9 // X and | |
| A4: a=LDir(X9) and | |
| A5: A=[PDir(Y),2]; | |
| X is being_line by A3,AFF_1:36; | |
| then | |
| A6: X9 '||' Y by A1,A2,A3,AFF_4:42,56; | |
| X9 is being_line by A3,AFF_1:36; | |
| hence thesis by A1,A4,A5,A6,Th29; | |
| end; | |
| theorem | |
| A=[PDir(X),2] & X is being_plane & a on A implies a is not Element of | |
| AS by Th27; | |
| theorem Th34: | |
| A=[X,1] & X is being_line & p on A & p is not Element of AS implies p=LDir(X) | |
| proof | |
| assume that | |
| A1: A=[X,1] and | |
| A2: X is being_line and | |
| A3: p on A and | |
| A4: not p is Element of AS; | |
| consider Xp being Subset of AS such that | |
| A5: p=LDir(Xp) and | |
| A6: Xp is being_line by A4,Th20; | |
| Xp '||' X by A1,A2,A3,A5,A6,Th28; | |
| hence thesis by A2,A5,A6,Th12; | |
| end; | |
| theorem Th35: | |
| A=[X,1] & X is being_line & p on A & a on A & a<>p & not p is | |
| Element of AS implies a is Element of AS | |
| proof | |
| assume that | |
| A1: A=[X,1] and | |
| A2: X is being_line and | |
| A3: p on A and | |
| A4: a on A and | |
| A5: a<>p and | |
| A6: not p is Element of AS; | |
| assume not thesis; | |
| then a=LDir(X) by A1,A2,A4,Th34; | |
| hence contradiction by A1,A2,A3,A5,A6,Th34; | |
| end; | |
| theorem Th36: | |
| for a being Element of the Points of ProjHorizon(AS),A being | |
| Element of the Lines of ProjHorizon(AS) st a=LDir(X) & A=PDir(Y) & X is | |
| being_line & Y is being_plane holds (a on A iff X '||' Y) | |
| proof | |
| let a be Element of the Points of ProjHorizon(AS),A be Element of the Lines | |
| of ProjHorizon(AS) such that | |
| A1: a=LDir(X) and | |
| A2: A=PDir(Y) and | |
| A3: X is being_line and | |
| A4: Y is being_plane; | |
| A5: now | |
| assume a on A; | |
| then [a,A] in the Inc of ProjHorizon(AS) by INCSP_1:def 1; | |
| then consider X9,Y9 such that | |
| A6: a=LDir(X9) and | |
| A7: A=PDir(Y9) and | |
| A8: X9 is being_line and | |
| A9: Y9 is being_plane and | |
| A10: X9 '||' Y9 by Def12; | |
| X // X9 by A1,A3,A6,A8,Th11; | |
| then | |
| A11: X '||' Y9 by A10,AFF_4:56; | |
| Y9 '||' Y by A2,A4,A7,A9,Th13; | |
| hence X '||' Y by A9,A11,AFF_4:59,60; | |
| end; | |
| now | |
| assume X '||' Y; | |
| then [a,A] in Inc_of_Dir(AS) by A1,A2,A3,A4,Def12; | |
| hence a on A by INCSP_1:def 1; | |
| end; | |
| hence thesis by A5; | |
| end; | |
| theorem Th37: | |
| for a being Element of the Points of ProjHorizon(AS),a9 being | |
| Element of the Points of IncProjSp_of(AS),A being Element of the Lines of | |
| ProjHorizon(AS),A9 being LINE of IncProjSp_of(AS) st a9=a & A9=[A,2] holds (a | |
| on A iff a9 on A9) | |
| proof | |
| let a be Element of the Points of ProjHorizon(AS),a9 be Element of the | |
| Points of IncProjSp_of(AS),A be Element of the Lines of ProjHorizon(AS),A9 be | |
| LINE of IncProjSp_of(AS) such that | |
| A1: a9=a and | |
| A2: A9=[A,2]; | |
| consider X such that | |
| A3: a=LDir(X) and | |
| A4: X is being_line by Th14; | |
| consider Y such that | |
| A5: A=PDir(Y) and | |
| A6: Y is being_plane by Th15; | |
| A7: now | |
| assume a9 on A9; | |
| then X '||' Y by A1,A2,A3,A4,A5,A6,Th29; | |
| hence a on A by A3,A4,A5,A6,Th36; | |
| end; | |
| now | |
| assume a on A; | |
| then X '||' Y by A3,A4,A5,A6,Th36; | |
| hence a9 on A9 by A1,A2,A3,A4,A5,A6,Th29; | |
| end; | |
| hence thesis by A7; | |
| end; | |
| reserve A,K,M,N,P,Q for LINE of IncProjSp_of(AS); | |
| theorem Th38: | |
| for a,b being Element of the Points of ProjHorizon(AS), A,K | |
| being Element of the Lines of ProjHorizon(AS) st a on A & a on K & b on A & b | |
| on K holds a=b or A=K | |
| proof | |
| let a,b be Element of the Points of ProjHorizon(AS), A,K be Element of the | |
| Lines of ProjHorizon(AS) such that | |
| A1: a on A and | |
| A2: a on K and | |
| A3: b on A and | |
| A4: b on K; | |
| consider Y9 such that | |
| A5: b=LDir(Y9) and | |
| A6: Y9 is being_line by Th14; | |
| consider X9 such that | |
| A7: K=PDir(X9) and | |
| A8: X9 is being_plane by Th15; | |
| A9: Y9 '||' X9 by A4,A5,A6,A7,A8,Th36; | |
| consider Y such that | |
| A10: a=LDir(Y) and | |
| A11: Y is being_line by Th14; | |
| assume a<>b; | |
| then | |
| A12: not Y // Y9 by A10,A11,A5,A6,Th11; | |
| consider X such that | |
| A13: A=PDir(X) and | |
| A14: X is being_plane by Th15; | |
| A15: Y9 '||' X by A3,A5,A6,A13,A14,Th36; | |
| A16: Y '||' X9 by A2,A10,A11,A7,A8,Th36; | |
| Y '||' X by A1,A10,A11,A13,A14,Th36; | |
| then X '||' X9 by A11,A6,A14,A8,A12,A16,A15,A9,Th5; | |
| hence thesis by A13,A14,A7,A8,Th13; | |
| end; | |
| theorem Th39: | |
| for A being Element of the Lines of ProjHorizon(AS) ex a,b,c | |
| being Element of the Points of ProjHorizon(AS) st a on A & b on A & c on A & a | |
| <>b & b<>c & c <>a | |
| proof | |
| let A be Element of the Lines of ProjHorizon(AS); | |
| consider X such that | |
| A1: A=PDir(X) and | |
| A2: X is being_plane by Th15; | |
| consider x,y,z such that | |
| A3: x in X and | |
| A4: y in X and | |
| A5: z in X and | |
| A6: not LIN x,y,z by A2,AFF_4:34; | |
| A7: y<>z by A6,AFF_1:7; | |
| then | |
| A8: Line(y,z) is being_line by AFF_1:def 3; | |
| then | |
| A9: Line(y,z) '||' X by A2,A4,A5,A7,AFF_4:19,42; | |
| A10: z<>x by A6,AFF_1:7; | |
| then | |
| A11: Line(x,z) is being_line by AFF_1:def 3; | |
| then | |
| A12: Line(x,z) '||' X by A2,A3,A5,A10,AFF_4:19,42; | |
| A13: x<>y by A6,AFF_1:7; | |
| then | |
| A14: Line(x,y) is being_line by AFF_1:def 3; | |
| then reconsider | |
| a=LDir(Line(x,y)),b=LDir(Line(y,z)),c =LDir(Line(x,z)) as Element | |
| of the Points of ProjHorizon(AS) by A8,A11,Th14; | |
| take a,b,c; | |
| Line(x,y) '||' X by A2,A3,A4,A13,A14,AFF_4:19,42; | |
| hence a on A & b on A & c on A by A1,A2,A14,A8,A11,A9,A12,Th36; | |
| A15: x in Line(x,y) by AFF_1:15; | |
| A16: z in Line(y,z) by AFF_1:15; | |
| A17: y in Line(x,y) by AFF_1:15; | |
| A18: y in Line(y,z) by AFF_1:15; | |
| thus a<>b | |
| proof | |
| assume not thesis; | |
| then Line(x,y) // Line(y,z) by A14,A8,Th11; | |
| then z in Line(x,y) by A17,A18,A16,AFF_1:45; | |
| hence contradiction by A6,A14,A15,A17,AFF_1:21; | |
| end; | |
| A19: z in Line(x,z) by AFF_1:15; | |
| A20: x in Line(x,z) by AFF_1:15; | |
| thus b<>c | |
| proof | |
| assume not thesis; | |
| then Line(y,z) // Line(x,z) by A8,A11,Th11; | |
| then x in Line(y,z) by A16,A20,A19,AFF_1:45; | |
| hence contradiction by A6,A8,A18,A16,AFF_1:21; | |
| end; | |
| thus c <>a | |
| proof | |
| assume not thesis; | |
| then Line(x,y) // Line(x,z) by A14,A11,Th11; | |
| then z in Line(x,y) by A15,A20,A19,AFF_1:45; | |
| hence contradiction by A6,A14,A15,A17,AFF_1:21; | |
| end; | |
| end; | |
| theorem Th40: | |
| for a,b being Element of the Points of ProjHorizon(AS) ex A | |
| being Element of the Lines of ProjHorizon(AS) st a on A & b on A | |
| proof | |
| let a,b be Element of the Points of ProjHorizon(AS); | |
| consider X such that | |
| A1: a=LDir(X) and | |
| A2: X is being_line by Th14; | |
| consider X9 such that | |
| A3: b=LDir(X9) and | |
| A4: X9 is being_line by Th14; | |
| consider x,y being Element of AS such that | |
| A5: x in X9 and | |
| y in X9 and | |
| x<>y by A4,AFF_1:19; | |
| A6: x in x*X by A2,AFF_4:def 3; | |
| x*X is being_line by A2,AFF_4:27; | |
| then consider Z such that | |
| A7: X9 c= Z and | |
| A8: x*X c= Z and | |
| A9: Z is being_plane by A4,A5,A6,AFF_4:38; | |
| A10: X9 '||' Z by A4,A7,A9,AFF_4:42; | |
| reconsider A=PDir(Z) as Element of the Lines of ProjHorizon(AS) by A9,Th15; | |
| take A; | |
| X // x*X by A2,AFF_4:def 3; | |
| then X '||' Z by A2,A8,A9,AFF_4:41; | |
| hence thesis by A1,A2,A3,A4,A9,A10,Th36; | |
| end; | |
| Lm1: AS is not AffinPlane implies ex a being Element of the Points of | |
| ProjHorizon(AS),A being Element of the Lines of ProjHorizon(AS) st not a on A | |
| proof | |
| set x = the Element of AS; | |
| consider X such that | |
| A1: x in X and | |
| x in X and | |
| x in X and | |
| A2: X is being_plane by AFF_4:37; | |
| reconsider A=PDir(X) as Element of the Lines of ProjHorizon(AS) by A2,Th15; | |
| assume AS is not AffinPlane; | |
| then consider t such that | |
| A3: not t in X by A2,AFF_4:48; | |
| set Y=Line(x,t); | |
| A4: Y is being_line by A1,A3,AFF_1:def 3; | |
| then reconsider a=LDir(Y) as Element of the Points of ProjHorizon(AS) by Th14 | |
| ; | |
| take a,A; | |
| A5: t in Y by AFF_1:15; | |
| A6: x in Y by AFF_1:15; | |
| thus not a on A | |
| proof | |
| assume not thesis; | |
| then Y '||' X by A2,A4,Th36; | |
| then Y c= X by A1,A2,A4,A6,AFF_4:43; | |
| hence contradiction by A3,A5; | |
| end; | |
| end; | |
| Lm2: a on A & a on K & b on A & b on K implies a=b or A=K | |
| proof | |
| assume that | |
| A1: a on A and | |
| A2: a on K and | |
| A3: b on A and | |
| A4: b on K; | |
| consider X such that | |
| A5: A=[X,1] & X is being_line or A=[PDir(X),2] & X is being_plane by Th23; | |
| consider X9 such that | |
| A6: K=[X9,1] & X9 is being_line or K=[PDir(X9),2] & X9 is being_plane by Th23; | |
| assume | |
| A7: a<>b; | |
| A8: now | |
| given Y such that | |
| A9: a=LDir(Y) and | |
| A10: Y is being_line; | |
| A11: now | |
| given Y9 such that | |
| A12: b=LDir(Y9) and | |
| A13: Y9 is being_line; | |
| A14: not Y // Y9 by A7,A9,A10,A12,A13,Th11; | |
| A15: M=[Z,1] & Z is being_line implies not (a on M & b on M) | |
| proof | |
| assume that | |
| A16: M=[Z,1] and | |
| A17: Z is being_line; | |
| assume | |
| A18: not thesis; | |
| then Y9 '||' Z by A12,A13,A16,A17,Th28; | |
| then | |
| A19: Y9 // Z by A13,A17,AFF_4:40; | |
| Y '||' Z by A9,A10,A16,A17,A18,Th28; | |
| then Y // Z by A10,A17,AFF_4:40; | |
| then Y // Y9 by A19,AFF_1:44; | |
| hence contradiction by A7,A9,A10,A12,A13,Th11; | |
| end; | |
| then | |
| A20: Y9 '||' X by A1,A3,A5,A12,A13,Th29; | |
| A21: Y9 '||' X9 by A2,A4,A6,A12,A13,A15,Th29; | |
| A22: Y '||' X9 by A2,A4,A6,A9,A10,A15,Th29; | |
| Y '||' X by A1,A3,A5,A9,A10,A15,Th29; | |
| then X '||' X9 by A1,A2,A3,A4,A5,A6,A10,A13,A15,A14,A22,A20,A21,Th5; | |
| hence thesis by A1,A2,A3,A4,A5,A6,A15,Th13; | |
| end; | |
| now | |
| assume b is Element of AS; | |
| then reconsider y=b as Element of AS; | |
| A23: y in X9 by A4,A6,Th26,Th27; | |
| A24: y=b; | |
| then Y '||' X9 by A2,A4,A6,A9,A10,Th27,Th28; | |
| then | |
| A25: Y // X9 by A4,A6,A10,A24,Th27,AFF_4:40; | |
| Y '||' X by A1,A3,A5,A9,A10,A24,Th27,Th28; | |
| then Y // X by A3,A5,A10,A24,Th27,AFF_4:40; | |
| then | |
| A26: X // X9 by A25,AFF_1:44; | |
| y in X by A3,A5,Th26,Th27; | |
| hence thesis by A3,A4,A5,A6,A23,A26,Th27,AFF_1:45; | |
| end; | |
| hence thesis by A11,Th20; | |
| end; | |
| now | |
| assume a is Element of AS; | |
| then reconsider x=a as Element of AS; | |
| A27: x=a; | |
| A28: x in X9 by A2,A6,Th26,Th27; | |
| A29: x in X by A1,A5,Th26,Th27; | |
| A30: now | |
| given Y such that | |
| A31: b=LDir(Y) and | |
| A32: Y is being_line; | |
| Y '||' X9 by A2,A4,A6,A27,A31,A32,Th27,Th28; | |
| then | |
| A33: Y // X9 by A2,A6,A27,A32,Th27,AFF_4:40; | |
| Y '||' X by A1,A3,A5,A27,A31,A32,Th27,Th28; | |
| then Y // X by A1,A5,A27,A32,Th27,AFF_4:40; | |
| then X // X9 by A33,AFF_1:44; | |
| hence thesis by A1,A2,A5,A6,A29,A28,Th27,AFF_1:45; | |
| end; | |
| now | |
| assume b is Element of AS; | |
| then reconsider y=b as Element of AS; | |
| A34: y in X9 by A4,A6,Th26,Th27; | |
| y in X by A3,A5,Th26,Th27; | |
| hence thesis by A1,A2,A7,A5,A6,A29,A28,A34,Th27,AFF_1:18; | |
| end; | |
| hence thesis by A30,Th20; | |
| end; | |
| hence thesis by A8,Th20; | |
| end; | |
| Lm3: ex a,b,c st a on A & b on A & c on A & a<>b & b<>c & c <>a | |
| proof | |
| consider X such that | |
| A1: A=[X,1] & X is being_line or A=[PDir(X),2] & X is being_plane by Th23; | |
| A2: now | |
| assume that | |
| A3: A=[PDir(X),2] and | |
| A4: X is being_plane; | |
| consider x,y,z such that | |
| A5: x in X and | |
| A6: y in X and | |
| A7: z in X and | |
| A8: not LIN x,y,z by A4,AFF_4:34; | |
| A9: y<>z by A8,AFF_1:7; | |
| then | |
| A10: Line(y,z) is being_line by AFF_1:def 3; | |
| then | |
| A11: Line(y,z) '||' X by A4,A6,A7,A9,AFF_4:19,42; | |
| A12: z<>x by A8,AFF_1:7; | |
| then | |
| A13: Line(x,z) is being_line by AFF_1:def 3; | |
| then | |
| A14: Line(x,z) '||' X by A4,A5,A7,A12,AFF_4:19,42; | |
| A15: x<>y by A8,AFF_1:7; | |
| then | |
| A16: Line(x,y) is being_line by AFF_1:def 3; | |
| then reconsider | |
| a=LDir(Line(x,y)),b=LDir(Line(y,z)),c =LDir(Line(x,z)) as POINT | |
| of IncProjSp_of(AS) by A10,A13,Th20; | |
| take a,b,c; | |
| Line(x,y) '||' X by A4,A5,A6,A15,A16,AFF_4:19,42; | |
| hence a on A & b on A & c on A by A3,A4,A16,A10,A13,A11,A14,Th29; | |
| A17: x in Line(x,y) by AFF_1:15; | |
| A18: z in Line(y,z) by AFF_1:15; | |
| A19: y in Line(x,y) by AFF_1:15; | |
| A20: y in Line(y,z) by AFF_1:15; | |
| thus a<>b | |
| proof | |
| assume not thesis; | |
| then Line(x,y) // Line(y,z) by A16,A10,Th11; | |
| then z in Line(x,y) by A19,A20,A18,AFF_1:45; | |
| hence contradiction by A8,A16,A17,A19,AFF_1:21; | |
| end; | |
| A21: z in Line(x,z) by AFF_1:15; | |
| A22: x in Line(x,z) by AFF_1:15; | |
| thus b<>c | |
| proof | |
| assume not thesis; | |
| then Line(y,z) // Line(x,z) by A10,A13,Th11; | |
| then x in Line(y,z) by A18,A22,A21,AFF_1:45; | |
| hence contradiction by A8,A10,A20,A18,AFF_1:21; | |
| end; | |
| thus c <>a | |
| proof | |
| assume not thesis; | |
| then Line(x,y) // Line(x,z) by A16,A13,Th11; | |
| then z in Line(x,y) by A17,A22,A21,AFF_1:45; | |
| hence contradiction by A8,A16,A17,A19,AFF_1:21; | |
| end; | |
| end; | |
| now | |
| assume that | |
| A23: A=[X,1] and | |
| A24: X is being_line; | |
| reconsider c =LDir(X) as POINT of IncProjSp_of(AS) by A24,Th20; | |
| consider x,y such that | |
| A25: x in X and | |
| A26: y in X and | |
| A27: x<>y by A24,AFF_1:19; | |
| reconsider a=x,b=y as Element of the Points of IncProjSp_of(AS) by Th20; | |
| take a,b,c; | |
| X // X by A24,AFF_1:41; | |
| then X '||' X by A24,AFF_4:40; | |
| hence a on A & b on A & c on A by A23,A24,A25,A26,Th26,Th28; | |
| thus a<>b by A27; | |
| thus b<>c & c <>a | |
| proof | |
| assume | |
| A28: not thesis; | |
| c in Dir_of_Lines(AS) by A24,Th14; | |
| then (the carrier of AS) /\ Dir_of_Lines(AS) <> {} by A28,XBOOLE_0:def 4; | |
| then (the carrier of AS) meets Dir_of_Lines(AS) by XBOOLE_0:def 7; | |
| hence contradiction by Th16; | |
| end; | |
| end; | |
| hence thesis by A1,A2; | |
| end; | |
| Lm4: ex A st a on A & b on A | |
| proof | |
| A1: now | |
| given X such that | |
| A2: a=LDir(X) and | |
| A3: X is being_line; | |
| A4: now | |
| given X9 such that | |
| A5: b=LDir(X9) and | |
| A6: X9 is being_line; | |
| consider x,y being Element of AS such that | |
| A7: x in X9 and | |
| y in X9 and | |
| x<>y by A6,AFF_1:19; | |
| A8: x in x*X by A3,AFF_4:def 3; | |
| x*X is being_line by A3,AFF_4:27; | |
| then consider Z such that | |
| A9: X9 c= Z and | |
| A10: x*X c= Z and | |
| A11: Z is being_plane by A6,A7,A8,AFF_4:38; | |
| A12: X9 '||' Z by A6,A9,A11,AFF_4:42; | |
| reconsider A=[PDir(Z),2] as LINE of IncProjSp_of(AS) by A11,Th23; | |
| take A; | |
| X // x*X by A3,AFF_4:def 3; | |
| then X '||' Z by A3,A10,A11,AFF_4:41; | |
| hence a on A & b on A by A2,A3,A5,A6,A11,A12,Th29; | |
| end; | |
| now | |
| assume b is Element of AS; | |
| then reconsider y=b as Element of AS; | |
| A13: y*X is being_line by A3,AFF_4:27; | |
| then reconsider A=[y*X,1] as LINE of IncProjSp_of(AS) by Th23; | |
| take A; | |
| X // y*X by A3,AFF_4:def 3; | |
| then X '||' y*X by A3,A13,AFF_4:40; | |
| hence a on A by A2,A3,A13,Th28; | |
| y in y*X by A3,AFF_4:def 3; | |
| hence b on A by A13,Th26; | |
| end; | |
| hence thesis by A4,Th20; | |
| end; | |
| now | |
| assume a is Element of AS; | |
| then reconsider x=a as Element of AS; | |
| A14: now | |
| given X9 such that | |
| A15: b=LDir(X9) and | |
| A16: X9 is being_line; | |
| A17: x*X9 is being_line by A16,AFF_4:27; | |
| then reconsider A=[x*X9,1] as LINE of IncProjSp_of(AS) by Th23; | |
| take A; | |
| x in x*X9 by A16,AFF_4:def 3; | |
| hence a on A by A17,Th26; | |
| X9 // x*X9 by A16,AFF_4:def 3; | |
| then X9 '||' x*X9 by A16,A17,AFF_4:40; | |
| hence b on A by A15,A16,A17,Th28; | |
| end; | |
| now | |
| assume b is Element of AS; | |
| then reconsider y=b as Element of AS; | |
| consider Y such that | |
| A18: x in Y and | |
| A19: y in Y and | |
| A20: Y is being_line by AFF_4:11; | |
| reconsider A=[Y,1] as LINE of IncProjSp_of(AS) by A20,Th23; | |
| take A; | |
| thus a on A & b on A by A18,A19,A20,Th26; | |
| end; | |
| hence thesis by A14,Th20; | |
| end; | |
| hence thesis by A1,Th20; | |
| end; | |
| Lm5: AS is AffinPlane implies ex a st a on A & a on K | |
| proof | |
| consider X such that | |
| A1: A=[X,1] & X is being_line or A=[PDir(X),2] & X is being_plane by Th23; | |
| consider X9 such that | |
| A2: K=[X9,1] & X9 is being_line or K=[PDir(X9),2] & X9 is being_plane by Th23; | |
| assume | |
| A3: AS is AffinPlane; | |
| A4: now | |
| assume that | |
| A5: A=[X,1] and | |
| A6: X is being_line; | |
| A7: now | |
| assume that | |
| A8: K=[X9,1] and | |
| A9: X9 is being_line; | |
| A10: now | |
| reconsider a=LDir(X),b=LDir(X9) as Element of the Points of | |
| IncProjSp_of(AS) by A6,A9,Th20; | |
| X9 // X9 by A9,AFF_1:41; | |
| then | |
| A11: X9 '||' X9 by A9,AFF_4:40; | |
| assume X // X9; | |
| then | |
| A12: a=b by A6,A9,Th11; | |
| take a; | |
| X // X by A6,AFF_1:41; | |
| then X '||' X by A6,AFF_4:40; | |
| hence a on A & a on K by A5,A6,A8,A9,A12,A11,Th28; | |
| end; | |
| now | |
| assume not X // X9; | |
| then consider x such that | |
| A13: x in X and | |
| A14: x in X9 by A3,A6,A9,AFF_1:58; | |
| reconsider a=x as Element of the Points of IncProjSp_of(AS) by Th20; | |
| take a; | |
| thus a on A & a on K by A5,A6,A8,A9,A13,A14,Th26; | |
| end; | |
| hence thesis by A10; | |
| end; | |
| now | |
| X // X by A6,AFF_1:41; | |
| then | |
| A15: X '||' X by A6,AFF_4:40; | |
| reconsider a=LDir(X) as Element of the Points of IncProjSp_of(AS) by A6 | |
| ,Th20; | |
| assume that | |
| A16: K=[PDir(X9),2] and | |
| A17: X9 is being_plane; | |
| take a; | |
| X9=the carrier of AS by A3,A17,Th2; | |
| then X '||' X9 by A6,A17,AFF_4:42; | |
| hence a on A & a on K by A5,A6,A16,A17,A15,Th28,Th29; | |
| end; | |
| hence thesis by A2,A7; | |
| end; | |
| now | |
| assume that | |
| A18: A=[PDir(X),2] and | |
| A19: X is being_plane; | |
| A20: X=the carrier of AS by A3,A19,Th2; | |
| A21: now | |
| assume that | |
| A22: K=[X9,1] and | |
| A23: X9 is being_line; | |
| X9 // X9 by A23,AFF_1:41; | |
| then | |
| A24: X9 '||' X9 by A23,AFF_4:40; | |
| reconsider a=LDir(X9) as POINT of IncProjSp_of(AS) by A23,Th20; | |
| take a; | |
| X9 '||' X by A19,A20,A23,AFF_4:42; | |
| hence a on A & a on K by A18,A19,A22,A23,A24,Th28,Th29; | |
| end; | |
| now | |
| consider a,b,c such that | |
| A25: a on A and | |
| b on A and | |
| c on A and | |
| a<>b and | |
| b<>c and | |
| c <>a by Lm3; | |
| assume that | |
| A26: K=[PDir(X9),2] and | |
| A27: X9 is being_plane; | |
| take a; | |
| thus a on A & a on K by A3,A18,A19,A26,A27,A25,Th3; | |
| end; | |
| hence thesis by A2,A21; | |
| end; | |
| hence thesis by A1,A4; | |
| end; | |
| Lm6: ex a,A st not a on A | |
| proof | |
| consider x,y,z such that | |
| A1: not LIN x,y,z by AFF_1:12; | |
| y<>z by A1,AFF_1:7; | |
| then | |
| A2: Line(y,z) is being_line by AFF_1:def 3; | |
| then reconsider A=[Line(y,z),1] as LINE of IncProjSp_of(AS) by Th23; | |
| reconsider a=x as POINT of IncProjSp_of(AS) by Th20; | |
| take a,A; | |
| thus not a on A | |
| proof | |
| assume not thesis; | |
| then | |
| A3: x in Line(y,z) by Th26; | |
| A4: z in Line(y,z) by AFF_1:15; | |
| y in Line(y,z) by AFF_1:15; | |
| hence contradiction by A1,A2,A3,A4,AFF_1:21; | |
| end; | |
| end; | |
| theorem Th41: | |
| for x,y being Element of the Points of ProjHorizon(AS), X being | |
| Element of the Lines of IncProjSp_of(AS) st x<>y & [x,X] in the Inc of | |
| IncProjSp_of(AS) & [y,X] in the Inc of IncProjSp_of(AS) ex Y being Element of | |
| the Lines of ProjHorizon(AS) st X=[Y,2] | |
| proof | |
| let x,y be Element of the Points of ProjHorizon(AS), X be Element of the | |
| Lines of IncProjSp_of(AS); | |
| reconsider a=x,b=y as POINT of IncProjSp_of(AS) by Th22; | |
| assume that | |
| A1: x<>y and | |
| A2: [x,X] in the Inc of IncProjSp_of(AS) and | |
| A3: [y,X] in the Inc of IncProjSp_of(AS); | |
| A4: b on X by A3,INCSP_1:def 1; | |
| consider Y being Element of the Lines of ProjHorizon(AS) such that | |
| A5: x on Y and | |
| A6: y on Y by Th40; | |
| reconsider A=[Y,2] as LINE of IncProjSp_of(AS) by Th25; | |
| consider Z being Subset of AS such that | |
| A7: Y=PDir(Z) and | |
| A8: Z is being_plane by Th15; | |
| consider X2 being Subset of AS such that | |
| A9: y=LDir(X2) and | |
| A10: X2 is being_line by Th14; | |
| X2 '||' Z by A9,A10,A6,A7,A8,Th36; | |
| then | |
| A11: b on A by A9,A10,A7,A8,Th29; | |
| take Y; | |
| consider X1 being Subset of AS such that | |
| A12: x=LDir(X1) and | |
| A13: X1 is being_line by Th14; | |
| X1 '||' Z by A12,A13,A5,A7,A8,Th36; | |
| then | |
| A14: a on A by A12,A13,A7,A8,Th29; | |
| a on X by A2,INCSP_1:def 1; | |
| hence thesis by A1,A4,A14,A11,Lm2; | |
| end; | |
| theorem Th42: | |
| for x being POINT of IncProjSp_of(AS),X being Element of the | |
| Lines of ProjHorizon(AS) st [x,[X,2]] in the Inc of IncProjSp_of(AS) holds x is | |
| Element of the Points of ProjHorizon(AS) | |
| proof | |
| let x be POINT of IncProjSp_of(AS), X be Element of the Lines of ProjHorizon | |
| (AS) such that | |
| A1: [x,[X,2]] in the Inc of IncProjSp_of(AS); | |
| reconsider A=[X,2] as LINE of IncProjSp_of(AS) by Th25; | |
| A2: ex Y st X=PDir(Y) & Y is being_plane by Th15; | |
| not x is Element of AS | |
| proof | |
| assume not thesis; | |
| then reconsider a=x as Element of AS; | |
| A3: a=x; | |
| x on A by A1,INCSP_1:def 1; | |
| hence contradiction by A2,A3,Th27; | |
| end; | |
| then ex Y9 st x=LDir(Y9) & Y9 is being_line by Th20; | |
| hence thesis by Th14; | |
| end; | |
| Lm7: X is being_line & X9 is being_line & Y is being_plane & X c= Y & X9 c= Y | |
| & A=[X,1] & K=[X9,1] & b on A & c on K & b on M & c on M & b<>c & M=[Y9,1] & Y9 | |
| is being_line implies Y9 c= Y | |
| proof | |
| assume that | |
| A1: X is being_line and | |
| A2: X9 is being_line and | |
| A3: Y is being_plane and | |
| A4: X c= Y and | |
| A5: X9 c= Y and | |
| A6: A=[X,1] and | |
| A7: K=[X9,1] and | |
| A8: b on A and | |
| A9: c on K and | |
| A10: b on M and | |
| A11: c on M and | |
| A12: b<>c and | |
| A13: M=[Y9,1] and | |
| A14: Y9 is being_line; | |
| A15: now | |
| assume b is Element of AS; | |
| then reconsider y=b as Element of AS; | |
| A16: now | |
| given Xc being Subset of AS such that | |
| A17: c =LDir(Xc) and | |
| A18: Xc is being_line; | |
| Xc '||' X9 by A2,A7,A9,A17,A18,Th28; | |
| then | |
| A19: Xc // X9 by A2,A18,AFF_4:40; | |
| Xc '||' Y9 by A11,A13,A14,A17,A18,Th28; | |
| then Xc // Y9 by A14,A18,AFF_4:40; | |
| then | |
| A20: X9 // Y9 by A19,AFF_1:44; | |
| y in Y9 by A10,A13,Th26; | |
| then | |
| A21: Y9= y*X9 by A2,A20,AFF_4:def 3; | |
| y in X by A6,A8,Th26; | |
| hence thesis by A2,A3,A4,A5,A21,AFF_4:28; | |
| end; | |
| now | |
| assume c is Element of AS; | |
| then reconsider z=c as Element of AS; | |
| A22: z in Y9 by A11,A13,Th26; | |
| y in Y9 by A10,A13,Th26; | |
| then | |
| A23: Y9=Line(y,z) by A12,A14,A22,AFF_1:57; | |
| A24: z in X9 by A7,A9,Th26; | |
| y in X by A6,A8,Th26; | |
| hence thesis by A3,A4,A5,A12,A24,A23,AFF_4:19; | |
| end; | |
| hence thesis by A16,Th20; | |
| end; | |
| now | |
| given Xb being Subset of AS such that | |
| A25: b=LDir(Xb) and | |
| A26: Xb is being_line; | |
| A27: now | |
| assume c is Element of AS; | |
| then reconsider y=c as Element of AS; | |
| Xb '||' X by A1,A6,A8,A25,A26,Th28; | |
| then | |
| A28: Xb // X by A1,A26,AFF_4:40; | |
| Xb '||' Y9 by A10,A13,A14,A25,A26,Th28; | |
| then Xb // Y9 by A14,A26,AFF_4:40; | |
| then | |
| A29: X // Y9 by A28,AFF_1:44; | |
| y in Y9 by A11,A13,Th26; | |
| then | |
| A30: Y9=y*X by A1,A29,AFF_4:def 3; | |
| y in X9 by A7,A9,Th26; | |
| hence thesis by A1,A3,A4,A5,A30,AFF_4:28; | |
| end; | |
| now | |
| Xb '||' Y9 by A10,A13,A14,A25,A26,Th28; | |
| then | |
| A31: Xb // Y9 by A14,A26,AFF_4:40; | |
| given Xc being Subset of AS such that | |
| A32: c =LDir(Xc) and | |
| A33: Xc is being_line; | |
| Xc '||' Y9 by A11,A13,A14,A32,A33,Th28; | |
| then Xc // Y9 by A14,A33,AFF_4:40; | |
| then Xc // Xb by A31,AFF_1:44; | |
| hence contradiction by A12,A25,A26,A32,A33,Th11; | |
| end; | |
| hence thesis by A27,Th20; | |
| end; | |
| hence thesis by A15,Th20; | |
| end; | |
| Lm8: X is being_line & X9 is being_line & Y is being_plane & X c= Y & X9 c= Y | |
| & A=[X,1] & K=[X9,1] & b on A & c on K & b on M & c on M & b<>c & M=[PDir(Y9),2 | |
| ] & Y9 is being_plane implies Y9 '||' Y & Y '||' Y9 | |
| proof | |
| assume that | |
| A1: X is being_line and | |
| A2: X9 is being_line and | |
| A3: Y is being_plane and | |
| A4: X c= Y and | |
| A5: X9 c= Y and | |
| A6: A=[X,1] and | |
| A7: K=[X9,1] and | |
| A8: b on A and | |
| A9: c on K and | |
| A10: b on M and | |
| A11: c on M and | |
| A12: b<>c and | |
| A13: M=[PDir(Y9),2] and | |
| A14: Y9 is being_plane; | |
| b is Element of AS or ex Xb being Subset of AS st b=LDir(Xb) & Xb is | |
| being_line by Th20; | |
| then consider Xb being Subset of AS such that | |
| A15: b=LDir(Xb) and | |
| A16: Xb is being_line by A10,A13,Th27; | |
| A17: Xb '||' Y9 by A10,A13,A14,A15,A16,Th29; | |
| Xb '||' X by A1,A6,A8,A15,A16,Th28; | |
| then Xb // X by A1,A16,AFF_4:40; | |
| then | |
| A18: Xb '||' Y by A1,A3,A4,AFF_4:42,56; | |
| c is Element of AS or ex Xc being Subset of AS st c =LDir(Xc) & Xc is | |
| being_line by Th20; | |
| then consider Xc being Subset of AS such that | |
| A19: c =LDir(Xc) and | |
| A20: Xc is being_line by A11,A13,Th27; | |
| A21: Xc '||' Y9 by A11,A13,A14,A19,A20,Th29; | |
| Xc '||' X9 by A2,A7,A9,A19,A20,Th28; | |
| then Xc // X9 by A2,A20,AFF_4:40; | |
| then | |
| A22: Xc '||' Y by A2,A3,A5,AFF_4:42,56; | |
| not Xb // Xc by A12,A15,A16,A19,A20,Th11; | |
| hence thesis by A3,A14,A16,A20,A17,A21,A18,A22,Th5; | |
| end; | |
| theorem Th43: | |
| Y is being_plane & X is being_line & X9 is being_line & X c= Y & | |
| X9 c= Y & P=[X,1] & Q=[X9,1] implies ex q st q on P & q on Q | |
| proof | |
| assume that | |
| A1: Y is being_plane and | |
| A2: X is being_line and | |
| A3: X9 is being_line and | |
| A4: X c= Y and | |
| A5: X9 c= Y and | |
| A6: P=[X,1] and | |
| A7: Q=[X9,1]; | |
| A8: now | |
| reconsider q=LDir(X) as POINT of IncProjSp_of(AS) by A2,Th20; | |
| assume | |
| A9: X // X9; | |
| take q; | |
| LDir(X)=LDir(X9) by A2,A3,A9,Th11; | |
| hence q on P & q on Q by A2,A3,A6,A7,Th30; | |
| end; | |
| now | |
| given y such that | |
| A10: y in X and | |
| A11: y in X9; | |
| reconsider q=y as Element of the Points of IncProjSp_of(AS) by Th20; | |
| take q; | |
| thus q on P & q on Q by A2,A3,A6,A7,A10,A11,Th26; | |
| end; | |
| hence thesis by A1,A2,A3,A4,A5,A8,AFF_4:22; | |
| end; | |
| Lm9: a on M & b on M & c on N & d on N & p on M & p on N & a on P & c on P & b | |
| on Q & d on Q & not p on P & not p on Q & M<>N & p is Element of AS implies ex | |
| q st q on P & q on Q | |
| proof | |
| assume that | |
| A1: a on M and | |
| A2: b on M and | |
| A3: c on N and | |
| A4: d on N and | |
| A5: p on M and | |
| A6: p on N and | |
| A7: a on P and | |
| A8: c on P and | |
| A9: b on Q and | |
| A10: d on Q and | |
| A11: not p on P and | |
| A12: not p on Q and | |
| A13: M<>N and | |
| A14: p is Element of AS; | |
| A15: b<>d by A2,A4,A5,A6,A9,A12,A13,Lm2; | |
| reconsider x=p as Element of AS by A14; | |
| consider XM being Subset of AS such that | |
| A16: M=[XM,1] & XM is being_line or M=[PDir(XM),2] & XM is being_plane by Th23; | |
| consider XQ being Subset of AS such that | |
| A17: Q=[XQ,1] & XQ is being_line or Q=[PDir(XQ),2] & XQ is being_plane by Th23; | |
| consider XP being Subset of AS such that | |
| A18: P=[XP,1] & XP is being_line or P=[PDir(XP),2] & XP is being_plane by Th23; | |
| consider XN being Subset of AS such that | |
| A19: N=[XN,1] & XN is being_line or N=[PDir(XN),2] & XN is being_plane by Th23; | |
| A20: x in XM by A5,A16,Th26,Th27; | |
| x in XN by A6,A19,Th26,Th27; | |
| then consider Y such that | |
| A21: XM c= Y and | |
| A22: XN c= Y and | |
| A23: Y is being_plane by A5,A6,A16,A19,A20,Th27,AFF_4:38; | |
| A24: a<>c by A1,A3,A5,A6,A7,A11,A13,Lm2; | |
| A25: now | |
| assume that | |
| A26: P=[PDir(XP),2] and | |
| A27: XP is being_plane; | |
| A28: Y '||' XP by A1,A3,A5,A6,A7,A8,A24,A16,A19,A20,A21,A22,A23,A26,A27,Lm8 | |
| ,Th27; | |
| A29: now | |
| assume that | |
| A30: Q=[XQ,1] and | |
| A31: XQ is being_line; | |
| reconsider q=LDir(XQ) as POINT of IncProjSp_of(AS) by A31,Th20; | |
| take q; | |
| XQ c= Y by A2,A4,A5,A6,A9,A10,A15,A16,A19,A20,A21,A22,A23,A30,A31,Lm7 | |
| ,Th27; | |
| then XQ '||' Y by A23,A31,AFF_4:42; | |
| then XQ '||' XP by A23,A28,AFF_4:59,60; | |
| hence q on P by A26,A27,A31,Th29; | |
| thus q on Q by A30,A31,Th30; | |
| end; | |
| now | |
| consider q,r,p9 such that | |
| A32: q on P and | |
| r on P and | |
| p9 on P and | |
| q<>r and | |
| r<>p9 and | |
| p9<>q by Lm3; | |
| assume that | |
| A33: Q=[PDir(XQ),2] and | |
| A34: XQ is being_plane; | |
| take q; | |
| thus q on P by A32; | |
| Y '||' XQ by A2,A4,A5,A6,A9,A10,A15,A16,A19,A20,A21,A22,A23,A33,A34,Lm8 | |
| ,Th27; | |
| then XP '||' XQ by A23,A27,A28,A34,AFF_4:61; | |
| hence q on Q by A26,A27,A33,A34,A32,Th13; | |
| end; | |
| hence thesis by A17,A29; | |
| end; | |
| now | |
| assume that | |
| A35: P=[XP,1] and | |
| A36: XP is being_line; | |
| A37: XP c= Y by A1,A3,A5,A6,A7,A8,A24,A16,A19,A20,A21,A22,A23,A35,A36,Lm7,Th27; | |
| A38: now | |
| A39: XP '||' Y by A23,A36,A37,AFF_4:42; | |
| reconsider q=LDir(XP) as POINT of IncProjSp_of(AS) by A36,Th20; | |
| assume that | |
| A40: Q=[PDir(XQ),2] and | |
| A41: XQ is being_plane; | |
| take q; | |
| thus q on P by A35,A36,Th30; | |
| Y '||' XQ by A2,A4,A5,A6,A9,A10,A15,A16,A19,A20,A21,A22,A23,A40,A41,Lm8 | |
| ,Th27; | |
| then XP '||' XQ by A23,A39,AFF_4:59,60; | |
| hence q on Q by A36,A40,A41,Th29; | |
| end; | |
| now | |
| assume that | |
| A42: Q=[XQ,1] and | |
| A43: XQ is being_line; | |
| XQ c= Y by A2,A4,A5,A6,A9,A10,A15,A16,A19,A20,A21,A22,A23,A42,A43,Lm7 | |
| ,Th27; | |
| hence thesis by A23,A35,A36,A37,A42,A43,Th43; | |
| end; | |
| hence thesis by A17,A38; | |
| end; | |
| hence thesis by A18,A25; | |
| end; | |
| Lm10: a on M & b on M & c on N & d on N & p on M & p on N & a on P & c on P & | |
| b on Q & d on Q & not p on P & not p on Q & M<>N & not p is Element of AS & a | |
| is Element of AS implies ex q st q on P & q on Q | |
| proof | |
| assume that | |
| A1: a on M and | |
| A2: b on M and | |
| A3: c on N and | |
| A4: d on N and | |
| A5: p on M and | |
| A6: p on N and | |
| A7: a on P and | |
| A8: c on P and | |
| A9: b on Q and | |
| A10: d on Q and | |
| A11: not p on P and | |
| A12: not p on Q and | |
| A13: M<>N and | |
| A14: not p is Element of AS and | |
| A15: a is Element of AS; | |
| reconsider x=a as Element of AS by A15; | |
| consider XM being Subset of AS such that | |
| A16: M=[XM,1] & XM is being_line or M=[PDir(XM),2] & XM is being_plane by Th23; | |
| A17: x in XM by A1,A16,Th26,Th27; | |
| A18: b<>d by A2,A4,A5,A6,A9,A12,A13,Lm2; | |
| consider XN being Subset of AS such that | |
| A19: N=[XN,1] & XN is being_line or N=[PDir(XN),2] & XN is being_plane by Th23; | |
| consider XP being Subset of AS such that | |
| A20: P=[XP,1] & XP is being_line or P=[PDir(XP),2] & XP is being_plane by Th23; | |
| A21: x=a; | |
| then reconsider y=b as Element of AS by A1,A2,A5,A9,A12,A14,A16,Th27,Th35; | |
| A22: y in XM by A2,A16,Th26,Th27; | |
| consider X such that | |
| A23: p=LDir(X) and | |
| A24: X is being_line by A14,Th20; | |
| consider XQ being Subset of AS such that | |
| A25: Q=[XQ,1] & XQ is being_line or Q=[PDir(XQ),2] & XQ is being_plane by Th23; | |
| A26: x in XP by A7,A20,Th26,Th27; | |
| then consider Y such that | |
| A27: XM c= Y and | |
| A28: XP c= Y and | |
| A29: Y is being_plane by A1,A7,A16,A20,A17,Th27,AFF_4:38; | |
| A30: y=b; | |
| A31: X '||' XM by A1,A5,A23,A24,A16,A21,Th27,Th28; | |
| then | |
| A32: X // XM by A1,A24,A16,A21,Th27,AFF_4:40; | |
| A33: y in XQ by A9,A25,Th26,Th27; | |
| A34: not XM // XP by A1,A5,A7,A11,A16,A20,A17,A26,Th27,AFF_1:45; | |
| A35: now | |
| A36: X // XM by A1,A24,A16,A21,A31,Th27,AFF_4:40; | |
| assume that | |
| A37: N=[XN,1] and | |
| A38: XN is being_line; | |
| X '||' XN by A6,A23,A24,A37,A38,Th28; | |
| then X // XN by A24,A38,AFF_4:40; | |
| then | |
| A39: XM // XN by A36,AFF_1:44; | |
| c is Element of AS | |
| proof | |
| assume not thesis; | |
| then c =LDir( XN ) by A3,A37,A38,Th34; | |
| then XN '||' XP by A7,A8,A20,A21,A38,Th27,Th28; | |
| then XN // XP by A7,A20,A21,A38,Th27,AFF_4:40; | |
| hence contradiction by A34,A39,AFF_1:44; | |
| end; | |
| then reconsider z=c as Element of AS; | |
| z in XN by A3,A37,Th26; | |
| then | |
| A40: XN=z*XM by A1,A16,A21,A39,Th27,AFF_4:def 3; | |
| A41: not XN // XQ | |
| proof | |
| assume XN // XQ; | |
| then XM // XQ by A39,AFF_1:44; | |
| hence contradiction by A2,A5,A9,A12,A16,A25,A33,A22,Th27,AFF_1:45; | |
| end; | |
| now | |
| assume not d is Element of AS; | |
| then consider Xd being Subset of AS such that | |
| A42: d=LDir(Xd) and | |
| A43: Xd is being_line by Th20; | |
| Xd '||' XN by A4,A37,A38,A42,A43,Th28; | |
| then | |
| A44: Xd // XN by A38,A43,AFF_4:40; | |
| Xd '||' XQ by A9,A10,A25,A30,A42,A43,Th27,Th28; | |
| then Xd // XQ by A9,A25,A30,A43,Th27,AFF_4:40; | |
| hence contradiction by A41,A44,AFF_1:44; | |
| end; | |
| then reconsider w=d as Element of AS; | |
| w in XQ by A10,A25,Th26,Th27; | |
| then | |
| A45: XQ=Line(y,w) by A9,A18,A25,A33,Th27,AFF_1:57; | |
| z in XP by A8,A20,Th26,Th27; | |
| then | |
| A46: XN c= Y by A1,A16,A21,A27,A28,A29,A40,Th27,AFF_4:28; | |
| w in XN by A4,A37,Th26; | |
| then XQ c= Y by A18,A27,A29,A22,A46,A45,AFF_4:19; | |
| hence thesis by A7,A9,A20,A25,A21,A28,A29,A30,Th27,Th43; | |
| end; | |
| A47: XP '||' Y by A7,A20,A21,A28,A29,Th27,AFF_4:42; | |
| A48: XM '||' Y by A1,A16,A21,A27,A29,Th27,AFF_4:42; | |
| now | |
| assume that | |
| A49: N=[PDir(XN),2] and | |
| A50: XN is being_plane; | |
| c is not Element of AS by A3,A49,Th27; | |
| then c =LDir(XP) by A7,A8,A20,A21,Th27,Th34; | |
| then | |
| A51: XP '||' XN by A3,A7,A20,A21,A49,A50,Th27,Th29; | |
| d is not Element of AS by A4,A49,Th27; | |
| then d=LDir(XQ) by A9,A10,A25,A30,Th27,Th34; | |
| then | |
| A52: XQ '||' XN by A4,A9,A25,A30,A49,A50,Th27,Th29; | |
| X '||' XN by A6,A23,A24,A49,A50,Th29; | |
| then XM '||' XN by A32,AFF_4:56; | |
| then XN '||' Y by A1,A5,A7,A11,A16,A20,A17,A26,A29,A48,A47,A50,A51,Th5,Th27 | |
| ,AFF_1:45; | |
| then XQ '||' Y by A50,A52,AFF_4:59,60; | |
| then XQ c= Y by A9,A25,A27,A29,A33,A22,Th27,AFF_4:43; | |
| hence thesis by A7,A9,A20,A25,A21,A28,A29,A30,Th27,Th43; | |
| end; | |
| hence thesis by A19,A35; | |
| end; | |
| Lm11: a on M & b on M & c on N & d on N & p on M & p on N & a on P & c on P & | |
| b on Q & d on Q & not p on P & not p on Q & M<>N & not p is Element of AS & (a | |
| is Element of AS or b is Element of AS or c is Element of AS or d is Element of | |
| AS) implies ex q st q on P & q on Q | |
| proof | |
| assume that | |
| A1: a on M and | |
| A2: b on M and | |
| A3: c on N and | |
| A4: d on N and | |
| A5: p on M and | |
| A6: p on N and | |
| A7: a on P and | |
| A8: c on P and | |
| A9: b on Q and | |
| A10: d on Q and | |
| A11: not p on P and | |
| A12: not p on Q and | |
| A13: M<>N and | |
| A14: not p is Element of AS and | |
| A15: a is Element of AS or b is Element of AS or c is Element of AS or d | |
| is Element of AS; | |
| now | |
| assume b is Element of AS or d is Element of AS; | |
| then | |
| ex q st q on Q & q on P by A1,A2,A3,A4,A5,A6,A7,A8,A9,A10,A11,A12,A13,A14 | |
| ,Lm10; | |
| hence thesis; | |
| end; | |
| hence thesis by A1,A2,A3,A4,A5,A6,A7,A8,A9,A10,A11,A12,A13,A14,A15,Lm10; | |
| end; | |
| Lm12: a on M & b on M & c on N & d on N & p on M & p on N & a on P & c on P & | |
| b on Q & d on Q & not p on P & not p on Q & M<>N implies ex q st q on P & q on | |
| Q | |
| proof | |
| assume that | |
| A1: a on M and | |
| A2: b on M and | |
| A3: c on N and | |
| A4: d on N and | |
| A5: p on M and | |
| A6: p on N and | |
| A7: a on P and | |
| A8: c on P and | |
| A9: b on Q and | |
| A10: d on Q and | |
| A11: not p on P and | |
| A12: not p on Q and | |
| A13: M<>N; | |
| now | |
| assume | |
| A14: not p is Element of AS; | |
| now | |
| A15: b<>d by A2,A4,A5,A6,A9,A12,A13,Lm2; | |
| set x = the Element of AS; | |
| assume that | |
| A16: not a is Element of AS and | |
| A17: not b is Element of AS and | |
| A18: not c is Element of AS and | |
| A19: not d is Element of AS; | |
| consider Xa being Subset of AS such that | |
| A20: a=LDir(Xa) and | |
| A21: Xa is being_line by A16,Th20; | |
| consider Xc being Subset of AS such that | |
| A22: c =LDir(Xc) and | |
| A23: Xc is being_line by A18,Th20; | |
| consider Xb being Subset of AS such that | |
| A24: b=LDir(Xb) and | |
| A25: Xb is being_line by A17,Th20; | |
| consider Xd being Subset of AS such that | |
| A26: d=LDir(Xd) and | |
| A27: Xd is being_line by A19,Th20; | |
| consider Xp being Subset of AS such that | |
| A28: p=LDir(Xp) and | |
| A29: Xp is being_line by A14,Th20; | |
| set Xa9=x*Xa,Xb9=x*Xb,Xc9=x*Xc,Xd9=x*Xd,Xp9=x*Xp; | |
| consider y such that | |
| A30: x<>y and | |
| A31: y in Xa9 by A21,AFF_1:20,AFF_4:27; | |
| A32: Xp // Xp9 by A29,AFF_4:def 3; | |
| consider t such that | |
| A33: x<>t and | |
| A34: t in Xc9 by A23,AFF_1:20,AFF_4:27; | |
| set Y1=y*Xp9,Y2=t*Xp9; | |
| A35: Xp9 is being_line by A29,AFF_4:27; | |
| then | |
| A36: Y1 is being_line by AFF_4:27; | |
| A37: Y2 is being_line by A35,AFF_4:27; | |
| A38: Xb // Xb9 by A25,AFF_4:def 3; | |
| A39: Xd9 is being_line by A27,AFF_4:27; | |
| A40: Xd // Xd9 by A27,AFF_4:def 3; | |
| A41: x in Xc9 by A23,AFF_4:def 3; | |
| A42: x in Xb9 by A25,AFF_4:def 3; | |
| A43: Xb9 is being_line by A25,AFF_4:27; | |
| A44: x in Xd9 by A27,AFF_4:def 3; | |
| then consider XQ being Subset of AS such that | |
| A45: Xb9 c= XQ and | |
| A46: Xd9 c= XQ and | |
| A47: XQ is being_plane by A43,A39,A42,AFF_4:38; | |
| A48: Xa9 is being_line by A21,AFF_4:27; | |
| A49: Xp9 // Y2 by A35,AFF_4:def 3; | |
| A50: not Xd9 // Y2 | |
| proof | |
| assume Xd9 // Y2; | |
| then Xd // Y2 by A40,AFF_1:44; | |
| then Xd // Xp9 by A49,AFF_1:44; | |
| then Xd // Xp by A32,AFF_1:44; | |
| hence contradiction by A10,A12,A28,A29,A26,A27,Th11; | |
| end; | |
| A51: Xp9 // Y1 by A35,AFF_4:def 3; | |
| A52: not Xb9 // Y1 | |
| proof | |
| assume Xb9 // Y1; | |
| then Xb // Y1 by A38,AFF_1:44; | |
| then Xb // Xp9 by A51,AFF_1:44; | |
| then Xb // Xp by A32,AFF_1:44; | |
| hence contradiction by A9,A12,A28,A29,A24,A25,Th11; | |
| end; | |
| A53: x in Xa9 by A21,AFF_4:def 3; | |
| A54: Xc9 is being_line by A23,AFF_4:27; | |
| then consider XP being Subset of AS such that | |
| A55: Xa9 c= XP and | |
| A56: Xc9 c= XP and | |
| A57: XP is being_plane by A48,A53,A41,AFF_4:38; | |
| A58: x in Xp9 by A29,AFF_4:def 3; | |
| then consider X2 being Subset of AS such that | |
| A59: Xc9 c= X2 and | |
| A60: Xp9 c= X2 and | |
| A61: X2 is being_plane by A54,A35,A41,AFF_4:38; | |
| A62: Xc // Xc9 by A23,AFF_4:def 3; | |
| N=[PDir(X2),2] | |
| proof | |
| reconsider N9=[PDir(X2),2] as Element of the Lines of IncProjSp_of(AS) | |
| by A61,Th23; | |
| A63: c on N9 by A22,A62,A59,A61,Th32; | |
| p on N9 by A28,A32,A60,A61,Th32; | |
| hence thesis by A3,A6,A8,A11,A63,Lm2; | |
| end; | |
| then Xd '||' X2 by A4,A26,A27,A61,Th29; | |
| then | |
| A64: Xd9 c= X2 by A39,A41,A44,A40,A59,A61,AFF_4:43,56; | |
| consider X1 being Subset of the carrier of AS such that | |
| A65: Xa9 c= X1 and | |
| A66: Xp9 c= X1 and | |
| A67: X1 is being_plane by A48,A35,A53,A58,AFF_4:38; | |
| A68: Xa // Xa9 by A21,AFF_4:def 3; | |
| M=[PDir(X1),2] | |
| proof | |
| reconsider M9=[PDir(X1),2] as Element of the Lines of IncProjSp_of(AS) | |
| by A67,Th23; | |
| A69: a on M9 by A20,A68,A65,A67,Th32; | |
| p on M9 by A28,A32,A66,A67,Th32; | |
| hence thesis by A1,A5,A7,A11,A69,Lm2; | |
| end; | |
| then Xb '||' X1 by A2,A24,A25,A67,Th29; | |
| then | |
| A70: Xb9 c= X1 by A43,A53,A42,A38,A65,A67,AFF_4:43,56; | |
| Y1 c= X1 by A29,A31,A65,A66,A67,AFF_4:27,28; | |
| then consider z such that | |
| A71: z in Xb9 and | |
| A72: z in Y1 by A43,A36,A67,A70,A52,AFF_4:22; | |
| Y2 c= X2 by A29,A34,A59,A60,A61,AFF_4:27,28; | |
| then consider u such that | |
| A73: u in Xd9 and | |
| A74: u in Y2 by A39,A37,A61,A64,A50,AFF_4:22; | |
| set AC=Line(y,t),BD=Line(z,u); | |
| A75: y in AC by AFF_1:15; | |
| A76: y in Y1 by A35,AFF_4:def 3; | |
| A77: x<>z | |
| proof | |
| assume | |
| A78: not thesis; | |
| a = LDir(Xa9) by A20,A21,A48,A68,Th11 | |
| .= LDir(Y1) by A48,A53,A30,A31,A36,A76,A72,A78,AFF_1:18 | |
| .= LDir(Xp9) by A35,A36,A51,Th11 | |
| .= p by A28,A29,A35,A32,Th11; | |
| hence contradiction by A7,A11; | |
| end; | |
| A79: z<>u | |
| proof | |
| assume | |
| A80: not thesis; | |
| b= LDir(Xb9) by A24,A25,A43,A38,Th11 | |
| .= LDir(Xd9) by A43,A39,A42,A44,A71,A73,A77,A80,AFF_1:18 | |
| .= d by A26,A27,A39,A40,Th11; | |
| hence contradiction by A2,A4,A5,A6,A9,A12,A13,Lm2; | |
| end; | |
| then | |
| A81: BD is being_line by AFF_1:def 3; | |
| A82: Xa9<>Xc9 | |
| proof | |
| assume Xa9=Xc9; | |
| then a=LDir(Xc9) by A20,A21,A48,A68,Th11 | |
| .= c by A22,A23,A54,A62,Th11; | |
| hence contradiction by A1,A3,A5,A6,A7,A11,A13,Lm2; | |
| end; | |
| then | |
| A83: y<>t by A48,A54,A53,A41,A30,A31,A34,AFF_1:18; | |
| then | |
| A84: AC is being_line by AFF_1:def 3; | |
| A85: BD c= XQ by A71,A73,A79,A45,A46,A47,AFF_4:19; | |
| A86: t in AC by AFF_1:15; | |
| Y1 // Y2 by A51,A49,AFF_1:44; | |
| then consider X3 being Subset of AS such that | |
| A87: Y1 c= X3 and | |
| A88: Y2 c= X3 and | |
| A89: X3 is being_plane by AFF_4:39; | |
| A90: BD c= X3 by A87,A88,A89,A72,A74,A79,AFF_4:19; | |
| A91: a<>c by A1,A3,A5,A6,A7,A11,A13,Lm2; | |
| A92: P=[PDir(XP),2] & Q=[PDir(XQ),2] | |
| proof | |
| reconsider P9=[PDir(XP),2], Q9=[PDir(XQ),2] as LINE of IncProjSp_of(AS | |
| ) by A57,A47,Th23; | |
| A93: c on P9 by A22,A62,A56,A57,Th32; | |
| A94: b on Q9 by A24,A38,A45,A47,Th32; | |
| A95: d on Q9 by A26,A40,A46,A47,Th32; | |
| a on P9 by A20,A68,A55,A57,Th32; | |
| hence thesis by A7,A8,A9,A10,A91,A15,A93,A94,A95,Lm2; | |
| end; | |
| A96: now | |
| reconsider q=LDir(AC),q9=LDir(BD) as Element of the Points of | |
| IncProjSp_of(AS) by A84,A81,Th20; | |
| assume | |
| A97: AC // BD; | |
| take q; | |
| q=q9 by A84,A81,A97,Th11; | |
| hence q on P & q on Q by A31,A34,A71,A73,A83,A79,A84,A81,A55,A56,A57 | |
| ,A45,A46,A47,A92,Th31,AFF_4:19; | |
| end; | |
| A98: AC c= XP by A31,A34,A83,A55,A56,A57,AFF_4:19; | |
| A99: now | |
| given w such that | |
| A100: w in AC and | |
| A101: w in BD; | |
| set R=Line(x,w); | |
| A102: x<>w | |
| proof | |
| assume | |
| A103: x=w; | |
| then Xa9=AC by A48,A53,A30,A31,A84,A75,A100,AFF_1:18; | |
| hence contradiction by A54,A41,A33,A34,A82,A84,A86,A100,A103,AFF_1:18 | |
| ; | |
| end; | |
| then | |
| A104: R is being_line by AFF_1:def 3; | |
| then reconsider q=LDir(R) as POINT of IncProjSp_of(AS) by Th20; | |
| take q; | |
| thus q on P & q on Q by A53,A42,A55,A57,A45,A47,A92,A98,A85,A100,A101 | |
| ,A102,A104,Th31,AFF_4:19; | |
| end; | |
| t in Y2 by A35,AFF_4:def 3; | |
| then AC c= X3 by A76,A87,A88,A89,A83,AFF_4:19; | |
| hence thesis by A89,A84,A81,A90,A96,A99,AFF_4:22; | |
| end; | |
| hence thesis by A1,A2,A3,A4,A5,A6,A7,A8,A9,A10,A11,A12,A13,A14,Lm11; | |
| end; | |
| hence thesis by A1,A2,A3,A4,A5,A6,A7,A8,A9,A10,A11,A12,A13,Lm9; | |
| end; | |
| theorem Th44: | |
| for a,b,c,d,p being Element of the Points of ProjHorizon(AS),M,N | |
| ,P,Q being Element of the Lines of ProjHorizon(AS) st a on M & b on M & c on N | |
| & d on N & p on M & p on N & a on P & c on P & b on Q & d on Q & not p on P & | |
| not p on Q & M<>N ex q being Element of the Points of ProjHorizon(AS) st q on P | |
| & q on Q | |
| proof | |
| let a,b,c,d,p be Element of the Points of ProjHorizon(AS),M,N,P,Q be Element | |
| of the Lines of ProjHorizon(AS) such that | |
| A1: a on M and | |
| A2: b on M and | |
| A3: c on N and | |
| A4: d on N and | |
| A5: p on M and | |
| A6: p on N and | |
| A7: a on P and | |
| A8: c on P and | |
| A9: b on Q and | |
| A10: d on Q and | |
| A11: not p on P and | |
| A12: not p on Q and | |
| A13: M<>N; | |
| reconsider M9=[M,2],N9=[N,2],P9=[P,2],Q9=[Q,2] as LINE of IncProjSp_of(AS) | |
| by Th25; | |
| reconsider a9=a,b9=b,c9=c,d9=d,p9=p as POINT of IncProjSp_of(AS) by Th22; | |
| A14: b9 on M9 by A2,Th37; | |
| A15: M9<>N9 | |
| proof | |
| assume M9=N9; | |
| then M = [N,2]`1 | |
| .= N; | |
| hence contradiction by A13; | |
| end; | |
| A16: d9 on N9 by A4,Th37; | |
| A17: c9 on N9 by A3,Th37; | |
| A18: c9 on P9 by A8,Th37; | |
| A19: a9 on P9 by A7,Th37; | |
| A20: p9 on N9 by A6,Th37; | |
| A21: p9 on M9 by A5,Th37; | |
| A22: not p9 on Q9 by A12,Th37; | |
| A23: not p9 on P9 by A11,Th37; | |
| A24: d9 on Q9 by A10,Th37; | |
| A25: b9 on Q9 by A9,Th37; | |
| a9 on M9 by A1,Th37; | |
| then consider q9 being POINT of IncProjSp_of(AS) such that | |
| A26: q9 on P9 and | |
| A27: q9 on Q9 by A14,A17,A16,A21,A20,A19,A18,A25,A24,A23,A22,A15,Lm12; | |
| [q9,[P,2]] in the Inc of IncProjSp_of(AS) by A26,INCSP_1:def 1; | |
| then reconsider q=q9 as Element of the Points of ProjHorizon(AS) by Th42; | |
| take q; | |
| thus thesis by A26,A27,Th37; | |
| end; | |
| registration | |
| let AS; | |
| cluster IncProjSp_of(AS) -> partial linear up-2-dimensional up-3-rank | |
| Vebleian; | |
| correctness | |
| proof | |
| set XX = IncProjSp_of(AS); | |
| A1: for a,b being POINT of XX ex A being LINE of XX st a on A & b on A by Lm4; | |
| A2: ex a being POINT of XX, A being LINE of XX st not a on A by Lm6; | |
| A3: for A being LINE of XX ex a,b,c being POINT of XX st a<>b & b<>c & c | |
| <>a & a on A & b on A & c on A | |
| proof | |
| let A be LINE of XX; | |
| consider a,b,c being POINT of XX such that | |
| A4: a on A and | |
| A5: b on A and | |
| A6: c on A and | |
| A7: a<>b and | |
| A8: b<>c and | |
| A9: c <>a by Lm3; | |
| take a,b,c; | |
| thus thesis by A4,A5,A6,A7,A8,A9; | |
| end; | |
| A10: for a,b,c,d,p,q being POINT of XX, M,N,P,Q being LINE of XX st a on M | |
| & b on M & c on N & d on N & p on M & p on N & a on P & c on P & b on Q & d on | |
| Q & not p on P & not p on Q & M<>N holds ex q being POINT of XX st q on P & q | |
| on Q by Lm12; | |
| for a,b being POINT of XX, A,K being LINE of XX st a on A & b on A & a | |
| on K & b on K holds a=b or A=K by Lm2; | |
| hence thesis by A1,A2,A3,A10,INCPROJ:def 4,def 5,def 6,def 7,def 8; | |
| end; | |
| end; | |
| registration | |
| cluster strict 2-dimensional for IncProjSp; | |
| existence | |
| proof | |
| set AS = the AffinPlane; | |
| set XX=IncProjSp_of(AS); | |
| for A,K being LINE of XX ex a being POINT of XX st a on A & a on K by Lm5; | |
| then XX is 2-dimensional IncProjSp by INCPROJ:def 9; | |
| hence thesis; | |
| end; | |
| end; | |
| registration | |
| let AS be AffinPlane; | |
| cluster IncProjSp_of(AS) -> 2-dimensional; | |
| correctness | |
| proof | |
| set XX=IncProjSp_of(AS); | |
| for A,K being LINE of XX ex a being Element of the Points of XX st a | |
| on A & a on K by Lm5; | |
| hence thesis by INCPROJ:def 9; | |
| end; | |
| end; | |
| theorem | |
| IncProjSp_of(AS) is 2-dimensional implies AS is AffinPlane | |
| proof | |
| set x = the Element of AS; | |
| assume | |
| A1: IncProjSp_of(AS) is 2-dimensional; | |
| consider X such that | |
| A2: x in X and | |
| x in X and | |
| x in X and | |
| A3: X is being_plane by AFF_4:37; | |
| assume AS is not AffinPlane; | |
| then consider z such that | |
| A4: not z in X by A3,AFF_4:48; | |
| set Y=Line(x,z); | |
| A5: Y is being_line by A2,A4,AFF_1:def 3; | |
| then reconsider A=[PDir(X),2],K=[Y,1] as LINE of IncProjSp_of(AS) by A3,Th23; | |
| consider a being POINT of IncProjSp_of(AS) such that | |
| A6: a on A and | |
| A7: a on K by A1,INCPROJ:def 9; | |
| not a is Element of AS by A6,Th27; | |
| then consider Y9 such that | |
| A8: a=LDir(Y9) and | |
| A9: Y9 is being_line by Th20; | |
| Y9 '||' Y by A5,A7,A8,A9,Th28; | |
| then | |
| A10: Y9 // Y by A5,A9,AFF_4:40; | |
| A11: z in Y by AFF_1:15; | |
| A12: x in Y by AFF_1:15; | |
| Y9 '||' X by A3,A6,A8,A9,Th29; | |
| then Y c= X by A2,A3,A5,A12,A10,AFF_4:43,56; | |
| hence contradiction by A4,A11; | |
| end; | |
| theorem | |
| AS is not AffinPlane implies ProjHorizon(AS) is IncProjSp | |
| proof | |
| set XX = ProjHorizon(AS); | |
| A1: for a,b being Element of the Points of XX ex A being Element of the | |
| Lines of XX st a on A & b on A by Th40; | |
| A2: for A being Element of the Lines of XX ex a,b,c being Element of the | |
| Points of XX st a<>b & b<>c & c <>a & a on A & b on A & c on A | |
| proof | |
| let A be Element of the Lines of XX; | |
| consider a,b,c being Element of the Points of XX such that | |
| A3: a on A and | |
| A4: b on A and | |
| A5: c on A and | |
| A6: a<>b and | |
| A7: b<>c and | |
| A8: c <>a by Th39; | |
| take a,b,c; | |
| thus thesis by A3,A4,A5,A6,A7,A8; | |
| end; | |
| assume AS is not AffinPlane; | |
| then | |
| A9: ex a being Element of the Points of XX, A being Element of the Lines of | |
| XX st not a on A by Lm1; | |
| A10: for a,b,c,d,p,q being Element of the Points of XX, M,N,P,Q being | |
| Element of the Lines of XX st a on M & b on M & c on N & d on N & p on M & p on | |
| N & a on P & c on P & b on Q & d on Q & not p on P & not p on Q & M<>N holds ex | |
| q being Element of the Points of XX st q on P & q on Q by Th44; | |
| for a,b being Element of the Points of XX, A,K being Element of the | |
| Lines of XX st a on A & b on A & a on K & b on K holds a=b or A=K by Th38; | |
| hence thesis by A1,A9,A2,A10,INCPROJ:def 4,def 5,def 6,def 7,def 8; | |
| end; | |
| theorem | |
| ProjHorizon(AS) is IncProjSp implies AS is not AffinPlane | |
| proof | |
| set XX=ProjHorizon(AS); | |
| assume ProjHorizon(AS) is IncProjSp; | |
| then consider | |
| a being Element of the Points of XX, A being Element of the Lines | |
| of XX such that | |
| A1: not a on A by INCPROJ:def 6; | |
| consider X such that | |
| A2: a=LDir(X) and | |
| A3: X is being_line by Th14; | |
| consider Y such that | |
| A4: A=PDir(Y) and | |
| A5: Y is being_plane by Th15; | |
| assume AS is AffinPlane; | |
| then Y = the carrier of AS by A5,Th2; | |
| then X '||' Y by A3,A5,AFF_4:42; | |
| hence contradiction by A1,A2,A3,A4,A5,Th36; | |
| end; | |
| theorem Th48: | |
| for M,N being Subset of AS, o,a,b,c,a9,b9,c9 being Element | |
| of AS st M is being_line & N is being_line & M<>N & o in M & o in N | |
| & o<>b & o<>b9 & o<>c9 & b in M & c in M & a9 in N & b9 in N & c9 in N & a,b9 | |
| // b,a9 & b,c9 // c,b9 & (a=b or b=c or a=c) holds a,c9 // c,a9 | |
| proof | |
| let M,N be Subset of AS, o,a,b,c,a9,b9,c9 be Element of AS | |
| such that | |
| A1: M is being_line and | |
| A2: N is being_line and | |
| A3: M<>N and | |
| A4: o in M and | |
| A5: o in N and | |
| A6: o<>b and | |
| A7: o<>b9 and | |
| A8: o<>c9 and | |
| A9: b in M and | |
| A10: c in M and | |
| A11: a9 in N and | |
| A12: b9 in N and | |
| A13: c9 in N and | |
| A14: a,b9 // b,a9 and | |
| A15: b,c9 // c,b9 and | |
| A16: a=b or b=c or a=c; | |
| A17: c <>b9 by A1,A2,A3,A4,A5,A7,A10,A12,AFF_1:18; | |
| now | |
| assume | |
| A18: a=c; | |
| then b,c9 // b,a9 by A14,A15,A17,AFF_1:5; | |
| then a9=c9 by A1,A2,A3,A4,A5,A6,A8,A9,A11,A13,AFF_4:9; | |
| hence thesis by A18,AFF_1:2; | |
| end; | |
| hence thesis by A1,A2,A3,A4,A5,A6,A7,A8,A9,A11,A12,A13,A14,A15,A16,AFF_4:9; | |
| end; | |
| theorem | |
| IncProjSp_of(AS) is Pappian implies AS is Pappian | |
| proof | |
| set XX = IncProjSp_of(AS); | |
| assume | |
| A1: IncProjSp_of(AS) is Pappian; | |
| for M,N being Subset of AS, o,a,b,c,a9,b9,c9 being Element | |
| of AS st M is being_line & N is being_line & M<>N & o in M & o in N & o | |
| <>a & o<>a9 & o<>b & o<>b9 & o<>c & o<>c9 & a in M & b in M & c in M & a9 in N | |
| & b9 in N & c9 in N & a,b9 // b,a9 & b,c9 // c,b9 holds a,c9 // c,a9 | |
| proof | |
| let M,N be Subset of AS, o,a,b,c,a9,b9,c9 be Element of AS | |
| such that | |
| A2: M is being_line and | |
| A3: N is being_line and | |
| A4: M<>N and | |
| A5: o in M and | |
| A6: o in N and | |
| A7: o<>a and | |
| A8: o<>a9 and | |
| A9: o<>b and | |
| A10: o<>b9 and | |
| A11: o<>c and | |
| A12: o<>c9 and | |
| A13: a in M and | |
| A14: b in M and | |
| A15: c in M and | |
| A16: a9 in N and | |
| A17: b9 in N and | |
| A18: c9 in N and | |
| A19: a,b9 // b,a9 and | |
| A20: b,c9 // c,b9; | |
| A21: b<>c9 by A2,A3,A4,A5,A6,A9,A14,A18,AFF_1:18; | |
| then | |
| A22: Line(b,c9) is being_line by AFF_1:def 3; | |
| c <>a9 by A2,A3,A4,A5,A6,A8,A15,A16,AFF_1:18; | |
| then | |
| A23: Line(c,a9) is being_line by AFF_1:def 3; | |
| A24: b<>a9 by A2,A3,A4,A5,A6,A8,A14,A16,AFF_1:18; | |
| then | |
| A25: Line(b,a9) is being_line by AFF_1:def 3; | |
| A26: c <>b9 by A2,A3,A4,A5,A6,A10,A15,A17,AFF_1:18; | |
| then | |
| A27: Line(c,b9) is being_line by AFF_1:def 3; | |
| reconsider A3=[M,1],B3=[N,1] as Element of the Lines of XX by A2,A3,Th23; | |
| reconsider p=o,a1=a9,a2=c9,a3=b9,b1=a,b2=c,b3=b as Element of the Points | |
| of XX by Th20; | |
| A28: p on A3 by A2,A5,Th26; | |
| A29: a<>b9 by A2,A3,A4,A5,A6,A7,A13,A17,AFF_1:18; | |
| then | |
| A30: Line(a,b9) is being_line by AFF_1:def 3; | |
| then reconsider c1=LDir(Line(b,c9)),c2=LDir(Line(a,b9)) as Element of the | |
| Points of XX by A22,Th20; | |
| A31: b1 on A3 by A2,A13,Th26; | |
| a<>c9 by A2,A3,A4,A5,A6,A7,A13,A18,AFF_1:18; | |
| then | |
| A32: Line(a,c9) is being_line by AFF_1:def 3; | |
| then reconsider | |
| A1=[Line(b,c9),1],A2=[Line(b,a9),1],B1=[Line(a,b9),1], B2=[Line | |
| (c,b9),1],C1=[Line(c,a9),1],C2=[Line(a,c9),1] as Element of the Lines of XX by | |
| A30,A25,A22,A27,A23,Th23; | |
| A33: c2 on B1 by A30,Th30; | |
| A34: b3 on A3 by A2,A14,Th26; | |
| A35: b2 on A3 by A2,A15,Th26; | |
| consider Y such that | |
| A36: M c= Y and | |
| A37: N c= Y and | |
| A38: Y is being_plane by A2,A3,A5,A6,AFF_4:38; | |
| reconsider C39=[PDir(Y),2] as Element of the Lines of XX by A38,Th23; | |
| A39: c1 on C39 by A14,A18,A36,A37,A38,A21,A22,Th31,AFF_4:19; | |
| A40: c2 on C39 by A13,A17,A36,A37,A38,A29,A30,Th31,AFF_4:19; | |
| A41: a1 on B3 by A3,A16,Th26; | |
| A42: a3 on B3 by A3,A17,Th26; | |
| A43: p on B3 by A3,A6,Th26; | |
| b9 in Line(a,b9) by AFF_1:15; | |
| then | |
| A44: a3 on B1 by A30,Th26; | |
| a in Line(a,b9) by AFF_1:15; | |
| then | |
| A45: b1 on B1 by A30,Th26; | |
| A46: c in Line(c,a9) by AFF_1:15; | |
| then | |
| A47: b2 on C1 by A23,Th26; | |
| Line(b,c9) // Line(c,b9) by A20,A21,A26,AFF_1:37; | |
| then Line(b,c9) '||' Line(c,b9) by A22,A27,AFF_4:40; | |
| then | |
| A48: c1 on B2 by A22,A27,Th28; | |
| A49: c9 in Line(a,c9) by AFF_1:15; | |
| then | |
| A50: a2 on C2 by A32,Th26; | |
| b9 in Line(c,b9) by AFF_1:15; | |
| then | |
| A51: a3 on B2 by A27,Th26; | |
| c in Line(c,b9) by AFF_1:15; | |
| then | |
| A52: b2 on B2 by A27,Th26; | |
| c9 in Line(b,c9) by AFF_1:15; | |
| then | |
| A53: a2 on A1 by A22,Th26; | |
| b in Line(b,c9) by AFF_1:15; | |
| then | |
| A54: b3 on A1 by A22,Th26; | |
| A55: a2 on B3 by A3,A18,Th26; | |
| Line(a,b9) // Line(b,a9) by A19,A29,A24,AFF_1:37; | |
| then Line(a,b9) '||' Line(b,a9) by A30,A25,AFF_4:40; | |
| then | |
| A56: c2 on A2 by A30,A25,Th28; | |
| A57: a in Line(a,c9) by AFF_1:15; | |
| then | |
| A58: b1 on C2 by A32,Th26; | |
| a9 in Line(b,a9) by AFF_1:15; | |
| then | |
| A59: a1 on A2 by A25,Th26; | |
| b in Line(b,a9) by AFF_1:15; | |
| then | |
| A60: b3 on A2 by A25,Th26; | |
| A61: a9 in Line(c,a9) by AFF_1:15; | |
| then | |
| A62: a1 on C1 by A23,Th26; | |
| A63: c1 on A1 by A22,Th30; | |
| now | |
| A64: A3<>B3 | |
| proof | |
| assume A3=B3; | |
| then M=[N,1]`1 | |
| .= N; | |
| hence contradiction by A4; | |
| end; | |
| not p on C1 & not p on C2 | |
| proof | |
| assume p on C1 or p on C2; | |
| then a1 on A3 or a2 on A3 by A7,A11,A28,A31,A35,A58,A50,A47,A62,Lm2; | |
| hence contradiction by A8,A12,A28,A43,A41,A55,A64,INCPROJ:def 4; | |
| end; | |
| then consider c3 being Element of the Points of XX such that | |
| A65: c3 on C1 and | |
| A66: c3 on C2 by A28,A31,A35,A43,A41,A55,A58,A50,A47,A62,A64,INCPROJ:def 8; | |
| A67: {a2,b1,c3} on C2 by A58,A50,A66,INCSP_1:2; | |
| A68: {a1,b3,c2} on A2 by A60,A59,A56,INCSP_1:2; | |
| A69: {a3,b1,c2} on B1 by A45,A44,A33,INCSP_1:2; | |
| assume that | |
| A70: b1<>b2 and | |
| A71: b2<>b3 and | |
| A72: b3<>b1; | |
| A73: p,b1,b2,b3 are_mutually_distinct by A7,A9,A11,A70,A71,A72,ZFMISC_1:def 6 | |
| ; | |
| a1<>a2 & a2<>a3 & a1<>a3 | |
| proof | |
| A74: now | |
| assume a9=c9; | |
| then a,b9 // c,b9 by A19,A20,A24,AFF_1:5; | |
| hence contradiction by A2,A3,A4,A5,A6,A7,A10,A13,A15,A17,A70,AFF_4:9; | |
| end; | |
| assume not thesis; | |
| hence contradiction by A2,A3,A4,A5,A6,A7,A9,A10,A13,A14,A15,A17,A19,A20 | |
| ,A71,A72,A74,AFF_4:9; | |
| end; | |
| then | |
| A75: p,a1,a2,a3 are_mutually_distinct by A8,A10,A12,ZFMISC_1:def 6; | |
| A76: {a1,a2,a3} on B3 by A41,A55,A42,INCSP_1:2; | |
| A77: {b1,b2,b3} on A3 by A31,A35,A34,INCSP_1:2; | |
| A78: {a3,b2,c1} on B2 by A51,A52,A48,INCSP_1:2; | |
| A79: {a2,b3,c1} on A1 by A53,A54,A63,INCSP_1:2; | |
| A80: p on B3 by A3,A6,Th26; | |
| A81: p on A3 by A2,A5,Th26; | |
| A82: {c1,c2} on C39 by A39,A40,INCSP_1:1; | |
| {a1,b2,c3} on C1 by A47,A62,A65,INCSP_1:2; | |
| then c3 on C39 by A1,A75,A73,A64,A81,A80,A79,A69,A68,A78,A67,A77,A76,A82, | |
| INCPROJ:def 14; | |
| then not c3 is Element of AS by Th27; | |
| then consider Y such that | |
| A83: c3=LDir(Y) and | |
| A84: Y is being_line by Th20; | |
| Y '||' Line(c,a9) by A23,A65,A83,A84,Th28; | |
| then | |
| A85: Y // Line(c,a9) by A23,A84,AFF_4:40; | |
| Y '||' Line(a,c9) by A32,A66,A83,A84,Th28; | |
| then Y // Line(a,c9) by A32,A84,AFF_4:40; | |
| then Line(a,c9) // Line(c,a9) by A85,AFF_1:44; | |
| hence thesis by A57,A49,A46,A61,AFF_1:39; | |
| end; | |
| hence thesis by A2,A3,A4,A5,A6,A9,A10,A12,A14,A15,A16,A17,A18,A19,A20,Th48; | |
| end; | |
| hence thesis by AFF_2:def 2; | |
| end; | |
| theorem Th50: | |
| for A,P,C being Subset of AS, o,a,b,c,a9,b9,c9 being Element | |
| of AS st o in A & o in P & o in C & o<>a & o<>b & o<>c & a in A & b | |
| in P & b9 in P & c in C & c9 in C & A is being_line & P is being_line & C is | |
| being_line & A<>P & A<>C & a,b // a9,b9 & a,c // a9,c9 & (o=a9 or a=a9) holds b | |
| ,c // b9,c9 | |
| proof | |
| let A,P,C be Subset of AS, o,a,b,c,a9,b9,c9 be Element of AS | |
| such that | |
| A1: o in A and | |
| A2: o in P and | |
| A3: o in C and | |
| A4: o<>a and | |
| A5: o<>b and | |
| A6: o<>c and | |
| A7: a in A and | |
| A8: b in P and | |
| A9: b9 in P and | |
| A10: c in C and | |
| A11: c9 in C and | |
| A12: A is being_line and | |
| A13: P is being_line and | |
| A14: C is being_line and | |
| A15: A<>P and | |
| A16: A<>C and | |
| A17: a,b // a9,b9 and | |
| A18: a,c // a9,c9 and | |
| A19: o=a9 or a=a9; | |
| A20: now | |
| assume | |
| A21: a=a9; | |
| then | |
| A22: c =c9 by A1,A3,A4,A6,A7,A10,A11,A12,A14,A16,A18,AFF_4:9; | |
| b=b9 by A1,A2,A4,A5,A7,A8,A9,A12,A13,A15,A17,A21,AFF_4:9; | |
| hence thesis by A22,AFF_1:2; | |
| end; | |
| now | |
| assume | |
| A23: o=a9; | |
| then | |
| A24: o=c9 by A1,A3,A4,A6,A7,A10,A11,A12,A14,A16,A18,AFF_4:8; | |
| o=b9 by A1,A2,A4,A5,A7,A8,A9,A12,A13,A15,A17,A23,AFF_4:8; | |
| hence thesis by A24,AFF_1:3; | |
| end; | |
| hence thesis by A19,A20; | |
| end; | |
| theorem | |
| IncProjSp_of(AS) is Desarguesian implies AS is Desarguesian | |
| proof | |
| set XX= IncProjSp_of(AS); | |
| assume | |
| A1: IncProjSp_of(AS) is Desarguesian; | |
| for A,P,C being Subset of AS, o,a,b,c,a9,b9,c9 being Element | |
| of AS st o in A & o in P & o in C & o<>a & o<>b & o<>c & a in A & a9 in | |
| A & b in P & b9 in P & c in C & c9 in C & A is being_line & P is being_line & C | |
| is being_line & A<>P & A<>C & a,b // a9,b9 & a,c // a9,c9 holds b,c // b9,c9 | |
| proof | |
| let A,P,C be Subset of AS, o,a,b,c,a9,b9,c9 be Element of | |
| AS such that | |
| A2: o in A and | |
| A3: o in P and | |
| A4: o in C and | |
| A5: o<>a and | |
| A6: o<>b and | |
| A7: o<>c and | |
| A8: a in A and | |
| A9: a9 in A and | |
| A10: b in P and | |
| A11: b9 in P and | |
| A12: c in C and | |
| A13: c9 in C and | |
| A14: A is being_line and | |
| A15: P is being_line and | |
| A16: C is being_line and | |
| A17: A<>P and | |
| A18: A<>C and | |
| A19: a,b // a9,b9 and | |
| A20: a,c // a9,c9; | |
| now | |
| assume | |
| A21: P<>C; | |
| now | |
| reconsider p=o,a1=a,b1=a9,a2=b,b2=b9,a3=c,b3=c9 as Element of the | |
| Points of XX by Th20; | |
| reconsider C1=[A,1],C2=[P,1],C39=[C,1] as Element of the Lines of XX | |
| by A14,A15,A16,Th23; | |
| assume that | |
| A22: a<>a9 and | |
| A23: o<>a9; | |
| A24: o<>c9 by A2,A4,A5,A7,A8,A9,A12,A14,A16,A18,A20,A23,AFF_4:8; | |
| A25: a9<>c9 by A2,A4,A9,A13,A14,A16,A18,A23,AFF_1:18; | |
| then | |
| A26: Line(a9,c9) is being_line by AFF_1:def 3; | |
| A27: o<>b9 by A2,A3,A5,A6,A8,A9,A10,A14,A15,A17,A19,A23,AFF_4:8; | |
| then b9<>c9 by A3,A4,A11,A13,A15,A16,A21,AFF_1:18; | |
| then | |
| A28: Line(b9,c9) is being_line by AFF_1:def 3; | |
| b<>c by A3,A4,A6,A10,A12,A15,A16,A21,AFF_1:18; | |
| then | |
| A29: Line(b,c) is being_line by AFF_1:def 3; | |
| A30: a<>c by A2,A4,A5,A8,A12,A14,A16,A18,AFF_1:18; | |
| then | |
| A31: Line(a,c) is being_line by AFF_1:def 3; | |
| A32: a<>b by A2,A3,A5,A8,A10,A14,A15,A17,AFF_1:18; | |
| then | |
| A33: Line(a,b) is being_line by AFF_1:def 3; | |
| then reconsider s=LDir(Line(a,b)),r=LDir(Line(a,c)) as Element of the | |
| Points of XX by A31,Th20; | |
| A34: p on C2 by A3,A15,Th26; | |
| A35: a9<>b9 by A2,A3,A9,A11,A14,A15,A17,A23,AFF_1:18; | |
| then | |
| A36: Line(a9,b9) is being_line by AFF_1:def 3; | |
| then reconsider | |
| A1=[Line(b,c),1],A2=[Line(a,c),1],A3=[Line(a,b),1], B1=[ | |
| Line(b9,c9),1],B2=[Line(a9,c9),1],B3=[Line(a9,b9),1] as Element of the Lines of | |
| XX by A33,A29,A31,A28,A26,Th23; | |
| A37: r on A2 by A31,Th30; | |
| A38: c in Line(b,c) by AFF_1:15; | |
| then | |
| A39: a3 on A1 by A29,Th26; | |
| A40: a3 on A1 by A29,A38,Th26; | |
| A41: c9 in Line(a9,c9) by AFF_1:15; | |
| then | |
| A42: b3 on B2 by A26,Th26; | |
| A43: a9 in Line(a9,c9) by AFF_1:15; | |
| then | |
| A44: b1 on B2 by A26,Th26; | |
| A45: Line(a,c) // Line(a9,c9) by A20,A30,A25,AFF_1:37; | |
| then Line(a,c) '||' Line(a9,c9) by A31,A26,AFF_4:40; | |
| then r on B2 by A31,A26,Th28; | |
| then | |
| A46: {b1,r,b3} on B2 by A44,A42,INCSP_1:2; | |
| A47: c <>c9 by A2,A4,A5,A7,A8,A9,A12,A14,A16,A18,A20,A22,AFF_4:9; | |
| A48: b1 on C1 by A9,A14,Th26; | |
| A49: a3 on C39 by A12,A16,Th26; | |
| A50: b9 in Line(a9,b9) by AFF_1:15; | |
| then | |
| A51: b2 on B3 by A36,Th26; | |
| A52: a9 in Line(a9,b9) by AFF_1:15; | |
| then | |
| A53: b1 on B3 by A36,Th26; | |
| A54: Line(a,b) // Line(a9,b9) by A19,A32,A35,AFF_1:37; | |
| then Line(a,b) '||' Line(a9,b9) by A33,A36,AFF_4:40; | |
| then s on B3 by A33,A36,Th28; | |
| then | |
| A55: {b1,s,b2} on B3 by A53,A51,INCSP_1:2; | |
| A56: now | |
| assume C2=C39; | |
| then P=[C,1]`1 | |
| .=C; | |
| hence contradiction by A21; | |
| end; | |
| A57: now | |
| assume C1=C39; | |
| then A=[C,1]`1 | |
| .=C; | |
| hence contradiction by A18; | |
| end; | |
| now | |
| assume C1=C2; | |
| then A=[P,1]`1 | |
| .=P; | |
| hence contradiction by A17; | |
| end; | |
| then | |
| A58: C1,C2,C39 are_mutually_distinct by A56,A57,ZFMISC_1:def 5; | |
| A59: a1 on C1 by A8,A14,Th26; | |
| A60: b3 on C39 by A13,A16,Th26; | |
| A61: p on C39 by A4,A16,Th26; | |
| then | |
| A62: {p,a3,b3} on C39 by A49,A60,INCSP_1:2; | |
| p on C1 by A2,A14,Th26; | |
| then | |
| A63: {p,b1,a1} on C1 by A48,A59,INCSP_1:2; | |
| A64: b2 on C2 by A11,A15,Th26; | |
| A65: a in Line(a,c) by AFF_1:15; | |
| then | |
| A66: a1 on A2 by A31,Th26; | |
| A67: c in Line(a,c) by AFF_1:15; | |
| then a3 on A2 by A31,Th26; | |
| then | |
| A68: {a3,r,a1} on A2 by A37,A66,INCSP_1:2; | |
| A69: b9 in Line(b9,c9) by AFF_1:15; | |
| then | |
| A70: b2 on B1 by A28,Th26; | |
| A71: c9 in Line(b9,c9) by AFF_1:15; | |
| then | |
| A72: b3 on B1 by A28,Th26; | |
| A73: b3 on B1 by A28,A71,Th26; | |
| A74: a2 on C2 by A10,A15,Th26; | |
| then | |
| A75: {p,a2,b2} on C2 by A34,A64,INCSP_1:2; | |
| A76: b in Line(b,c) by AFF_1:15; | |
| then | |
| A77: a2 on A1 by A29,Th26; | |
| not p on A1 & not p on B1 | |
| proof | |
| assume p on A1 or p on B1; | |
| then a3 on C2 or b3 on C2 by A6,A27,A34,A74,A64,A77,A40,A70,A73, | |
| INCPROJ:def 4; | |
| hence contradiction by A7,A24,A34,A61,A49,A60,A56,INCPROJ:def 4; | |
| end; | |
| then consider t being Element of the Points of XX such that | |
| A78: t on A1 and | |
| A79: t on B1 by A34,A61,A74,A64,A49,A60,A77,A40,A70,A73,A56,INCPROJ:def 8; | |
| a2 on A1 by A29,A76,Th26; | |
| then | |
| A80: {a3,a2,t} on A1 by A78,A39,INCSP_1:2; | |
| b2 on B1 by A28,A69,Th26; | |
| then | |
| A81: {t,b2,b3} on B1 by A79,A72,INCSP_1:2; | |
| A82: a in Line(a,b) by AFF_1:15; | |
| then | |
| A83: a1 on A3 by A33,Th26; | |
| A84: s on A3 by A33,Th30; | |
| A85: b in Line(a,b) by AFF_1:15; | |
| then a2 on A3 by A33,Th26; | |
| then | |
| A86: {a2,s,a1} on A3 by A84,A83,INCSP_1:2; | |
| b<>b9 by A2,A3,A5,A6,A8,A9,A10,A14,A15,A17,A19,A22,AFF_4:9; | |
| then consider O being Element of the Lines of XX such that | |
| A87: {r,s,t} on O by A1,A5,A6,A7,A22,A23,A27,A24,A47,A63,A75,A62,A80,A68,A86 | |
| ,A81,A46,A55,A58,INCPROJ:def 13; | |
| A88: t on O by A87,INCSP_1:2; | |
| A89: s on O by A87,INCSP_1:2; | |
| A90: r on O by A87,INCSP_1:2; | |
| A91: now | |
| assume | |
| A92: r<>s; | |
| ex X st O=[PDir(X),2] & X is being_plane | |
| proof | |
| reconsider x=LDir(Line(a,b)),y=LDir(Line(a,c)) as Element of the | |
| Points of ProjHorizon(AS) by A33,A31,Th14; | |
| A93: [y,O] in the Inc of IncProjSp_of(AS) by A90,INCSP_1:def 1; | |
| [x,O] in the Inc of IncProjSp_of(AS) by A89,INCSP_1:def 1; | |
| then consider | |
| Z9 being Element of the Lines of ProjHorizon(AS) such | |
| that | |
| A94: O=[Z9,2] by A92,A93,Th41; | |
| consider X such that | |
| A95: Z9=PDir(X) and | |
| A96: X is being_plane by Th15; | |
| take X; | |
| thus thesis by A94,A95,A96; | |
| end; | |
| then not t is Element of AS by A88,Th27; | |
| then consider Y such that | |
| A97: t=LDir(Y) and | |
| A98: Y is being_line by Th20; | |
| Y '||' Line(b9,c9) by A28,A79,A97,A98,Th28; | |
| then | |
| A99: Y // Line(b9,c9) by A28,A98,AFF_4:40; | |
| Y '||' Line(b,c) by A29,A78,A97,A98,Th28; | |
| then Y // Line(b,c) by A29,A98,AFF_4:40; | |
| then Line(b,c) // Line(b9,c9) by A99,AFF_1:44; | |
| hence thesis by A76,A38,A69,A71,AFF_1:39; | |
| end; | |
| now | |
| assume r=s; | |
| then | |
| A100: Line(a,b) // Line(a,c) by A33,A31,Th11; | |
| then Line(a,b) // Line(a9,c9) by A45,AFF_1:44; | |
| then Line(a9,b9) // Line(a9, c9) by A54,AFF_1:44; | |
| then | |
| A101: c9 in Line(a9,b9) by A52,A43,A41,AFF_1:45; | |
| c in Line(a,b) by A82,A65,A67,A100,AFF_1:45; | |
| hence thesis by A85,A50,A54,A101,AFF_1:39; | |
| end; | |
| hence thesis by A91; | |
| end; | |
| hence | |
| thesis by A2,A3,A4,A5,A6,A7,A8,A10,A11,A12,A13,A14,A15,A16,A17,A18,A19 | |
| ,A20,Th50; | |
| end; | |
| hence thesis by A10,A11,A12,A13,A15,AFF_1:51; | |
| end; | |
| hence thesis by AFF_2:def 4; | |
| end; | |
| theorem | |
| IncProjSp_of(AS) is Fanoian implies AS is Fanoian | |
| proof | |
| set XX=IncProjSp_of(AS); | |
| assume | |
| A1: IncProjSp_of(AS) is Fanoian; | |
| for a,b,c,d being Element of AS st a,b // c,d & a,c // b,d & a,d // b,c | |
| holds a,b // a,c | |
| proof | |
| let a,b,c,d be Element of AS such that | |
| A2: a,b // c,d and | |
| A3: a,c // b,d and | |
| A4: a,d // b,c; | |
| assume | |
| A5: not a,b // a,c; | |
| then | |
| A6: a<>d by A2,AFF_1:4; | |
| then | |
| A7: Line(a,d) is being_line by AFF_1:def 3; | |
| A8: now | |
| assume b=d; | |
| then b,a // b,c by A2,AFF_1:4; | |
| then LIN b,a,c by AFF_1:def 1; | |
| then LIN a,b,c by AFF_1:6; | |
| hence contradiction by A5,AFF_1:def 1; | |
| end; | |
| then | |
| A9: Line(b,d) is being_line by AFF_1:def 3; | |
| A10: now | |
| assume c =d; | |
| then c,a // c,b by A3,AFF_1:4; | |
| then LIN c,a,b by AFF_1:def 1; | |
| then LIN a,b,c by AFF_1:6; | |
| hence contradiction by A5,AFF_1:def 1; | |
| end; | |
| then | |
| A11: Line(c,d) is being_line by AFF_1:def 3; | |
| A12: a<>c by A5,AFF_1:3; | |
| then | |
| A13: Line(a,c) is being_line by AFF_1:def 3; | |
| A14: a<>b by A5,AFF_1:3; | |
| then | |
| A15: Line(a,b) is being_line by AFF_1:def 3; | |
| then reconsider | |
| a9=LDir(Line(a,b)),b9=LDir(Line(a,c)),c9=LDir(Line(a,d)) as | |
| Element of the Points of XX by A13,A7,Th20; | |
| A16: b<>c by A5,AFF_1:2; | |
| then | |
| A17: Line(b,c) is being_line by AFF_1:def 3; | |
| then reconsider | |
| L1=[Line(a,b),1],Q1=[Line(c,d),1],R1=[Line(b,d),1],S1=[Line(a,c | |
| ),1], A1=[Line(a,d),1],B1=[Line(b,c),1] as Element of the Lines of XX by A15 | |
| ,A11,A9,A13,A7,Th23; | |
| reconsider p=a,q=d,r=c,s=b as Element of the Points of XX by Th20; | |
| A18: a9 on L1 by A15,Th30; | |
| c in Line(b,c) by AFF_1:15; | |
| then | |
| A19: r on B1 by A17,Th26; | |
| b in Line(b,c) by AFF_1:15; | |
| then | |
| A20: s on B1 by A17,Th26; | |
| Line(a,d) // Line(b,c) by A4,A16,A6,AFF_1:37; | |
| then Line(a,d) '||' Line(b,c) by A7,A17,AFF_4:40; | |
| then c9 on B1 by A7,A17,Th28; | |
| then | |
| A21: {c9,r,s} on B1 by A19,A20,INCSP_1:2; | |
| A22: d in Line(b,d) by AFF_1:15; | |
| then | |
| A23: q on R1 by A9,Th26; | |
| A24: c in Line(a,c) by AFF_1:15; | |
| then | |
| A25: r on S1 by A13,Th26; | |
| A26: b9 on S1 by A13,Th30; | |
| A27: a in Line(a,c) by AFF_1:15; | |
| then p on S1 by A13,Th26; | |
| then | |
| A28: {b9,p,r} on S1 by A25,A26,INCSP_1:2; | |
| A29: Line(a,c) // Line(b,d) by A3,A12,A8,AFF_1:37; | |
| then Line(a,c) '||' Line(b,d) by A9,A13,AFF_4:40; | |
| then | |
| A30: b9 on R1 by A9,A13,Th28; | |
| A31: b in Line(b,d) by AFF_1:15; | |
| then s on R1 by A9,Th26; | |
| then | |
| A32: {b9,q,s} on R1 by A23,A30,INCSP_1:2; | |
| A33: now | |
| assume Line(a,c)=Line(b,d); | |
| then LIN a,c,b by A31,AFF_1:def 2; | |
| then LIN a,b,c by AFF_1:6; | |
| hence contradiction by A5,AFF_1:def 1; | |
| end; | |
| A34: now | |
| assume q on S1 or s on S1; | |
| then d in Line(a,c) or b in Line(a,c) by Th26; | |
| hence contradiction by A31,A22,A33,A29,AFF_1:45; | |
| end; | |
| A35: now | |
| assume p on R1 or r on R1; | |
| then a in Line(b,d) or c in Line(b,d) by Th26; | |
| hence contradiction by A27,A24,A33,A29,AFF_1:45; | |
| end; | |
| A36: a in Line(a,b) by AFF_1:15; | |
| then consider Y such that | |
| A37: Line(a,b) c= Y and | |
| A38: Line(a,c) c= Y and | |
| A39: Y is being_plane by A27,A15,A13,AFF_4:38; | |
| reconsider C1=[PDir(Y),2] as Element of the Lines of XX by A39,Th23; | |
| A40: b9 on C1 by A13,A38,A39,Th31; | |
| A41: Line(a,b) // Line(c,d) by A2,A14,A10,AFF_1:37; | |
| then Line(a,b) '||' Line(c,d) by A15,A11,AFF_4:40; | |
| then | |
| A42: a9 on Q1 by A15,A11,Th28; | |
| d in Line(a,d) by AFF_1:15; | |
| then | |
| A43: q on A1 by A7,Th26; | |
| a in Line(a,d) by AFF_1:15; | |
| then | |
| A44: p on A1 by A7,Th26; | |
| c9 on A1 by A7,Th30; | |
| then | |
| A45: {c9,p,q} on A1 by A44,A43,INCSP_1:2; | |
| A46: b in Line(a,b) by AFF_1:15; | |
| then | |
| A47: s on L1 by A15,Th26; | |
| a9 on C1 by A15,A37,A39,Th31; | |
| then | |
| A48: {a9,b9} on C1 by A40,INCSP_1:1; | |
| A49: d in Line(c,d) by AFF_1:15; | |
| then | |
| A50: q on Q1 by A11,Th26; | |
| A51: c in Line(c,d) by AFF_1:15; | |
| then r on Q1 by A11,Th26; | |
| then | |
| A52: {a9,q,r} on Q1 by A50,A42,INCSP_1:2; | |
| A53: now | |
| assume Line(a,b)=Line(c,d); | |
| then LIN a,b,c by A51,AFF_1:def 2; | |
| hence contradiction by A5,AFF_1:def 1; | |
| end; | |
| A54: now | |
| assume q on L1 or r on L1; | |
| then d in Line(a,b) or c in Line(a,b) by Th26; | |
| hence contradiction by A51,A49,A53,A41,AFF_1:45; | |
| end; | |
| A55: now | |
| assume p on Q1 or s on Q1; | |
| then a in Line(c,d) or b in Line(c,d) by Th26; | |
| hence contradiction by A36,A46,A53,A41,AFF_1:45; | |
| end; | |
| Line(b,d)=b*Line(a,c) by A31,A13,A29,AFF_4:def 3; | |
| then Line(b,d) c= Y by A46,A13,A37,A38,A39,AFF_4:28; | |
| then | |
| A56: c9 on C1 by A36,A22,A6,A7,A37,A39,Th31,AFF_4:19; | |
| p on L1 by A36,A15,Th26; | |
| then {a9,p,s} on L1 by A47,A18,INCSP_1:2; | |
| hence contradiction by A1,A56,A54,A34,A55,A35,A52,A32,A28,A45,A21,A48, | |
| INCPROJ:def 12; | |
| end; | |
| hence thesis by PAPDESAF:def 1; | |
| end; | |