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proof-pile

	:: Construction of Finite Sequences over Ring and Left-, Right-,
	:: and Bi-Modules over a Ring
	:: http://creativecommons.org/licenses/by-sa/3.0/.

	environ

	vocabularies NUMBERS, NAT_1, CARD_1, ARYTM_3, XBOOLE_0, XXREAL_0, TARSKI,
	STRUCT_0, FUNCT_1, SUPINF_2, FUNCOP_1, SUBSET_1, FINSEQ_1, RELAT_1,
	AFINSQ_1, ALGSEQ_1, POLYNOM1, FINSET_1;
	notations TARSKI, XBOOLE_0, SUBSET_1, CARD_1, FINSET_1, ORDINAL1, NUMBERS,
	MEMBERED, XCMPLX_0, NAT_1, XXREAL_2, RELAT_1, FUNCT_1, FUNCOP_1,
	STRUCT_0, FUNCT_2, XXREAL_0, POLYNOM1;
	constructors FUNCOP_1, XXREAL_0, XREAL_0, NAT_1, RLVECT_1, RELSET_1, POLYNOM1,
	XXREAL_2;
	registrations ORDINAL1, RELSET_1, XREAL_0, STRUCT_0, FINSET_1, CARD_1,
	XXREAL_2, MEMBERED;
	requirements NUMERALS, REAL, SUBSET, BOOLE, ARITHM;
	definitions TARSKI, XBOOLE_0, POLYNOM1;
	equalities XBOOLE_0;
	theorems TARSKI, ZFMISC_1, FUNCT_1, FUNCT_2, NAT_1, FUNCOP_1, XREAL_1,
	XXREAL_0, ORDINAL1, POLYNOM1, XXREAL_2;
	schemes FUNCT_2, NAT_1;

	begin

	reserve i,k,l,m,n for Nat,
	x for set;

	::
	:: Algebraic Sequences
	::

	reserve R for non empty ZeroStr;

	definition
	let R;
	let F be sequence of R;
	redefine attr F is finite-Support means
	:Def1:
	ex n st for i st i >= n holds F.i = 0. R;
	compatibility
	proof
	thus F is finite-Support implies
	ex n st for i st i >= n holds F.i = 0. R
	proof assume
	A1: Support F is finite;
	per cases;
	suppose
	A2: Support F = {};
	take 0; let i;
	assume i >= 0;
	assume
	A3: F.i <> 0. R;
	reconsider i as Element of NAT by ORDINAL1:def 12;
	i in Support F by A3,POLYNOM1:def 4;
	hence contradiction by A2;
	end;
	suppose Support F <> {};
	then reconsider A = Support F as non empty finite Subset of NAT by A1;
	take n = max A + 1;
	let i;
	assume i >= n;
	then
	A4: i > max A by NAT_1:13;
	assume
	A5: F.i <> 0. R;
	reconsider i as Element of NAT by ORDINAL1:def 12;
	i in Support F by A5,POLYNOM1:def 4;
	hence contradiction by A4,XXREAL_2:def 8;
	end;
	end;
	given n such that
	A6: for i st i >= n holds F.i = 0. R;
	Support F c= Segm n
	proof let e be object;
	assume
	A7: e in Support F;
	then reconsider i = e as Nat;
	F.i <> 0.R by A7,POLYNOM1:def 3;
	hence e in Segm n by A6,NAT_1:44;
	end;
	hence Support F is finite;
	end;
	end;

	registration
	let R;
	cluster finite-Support for sequence of R;
	existence
	proof
	reconsider f = NAT --> 0.R as sequence of the carrier of R;
	take f, 0;
	let i;
	thus thesis by FUNCOP_1:7,ORDINAL1:def 12;
	end;
	end;

	definition
	let R;
	mode AlgSequence of R is finite-Support sequence of R;
	end;

	reserve p,q for AlgSequence of R;

	definition
	let R,p;
	let k be Nat;
	pred k is_at_least_length_of p means
	:Def2:
	for i st i>=k holds p.i=0.R;
	end;

	Lm1: ex m st m is_at_least_length_of p
	proof
	consider n such that
	A1: for i st i >= n holds p.i = 0.R by Def1;
	take n;
	thus thesis by A1;
	end;

	definition
	let R,p;
	func len p -> Element of NAT means
	:Def3:
	it is_at_least_length_of p & for m st m is_at_least_length_of p holds it<=m;
	existence
	proof
	defpred P[Nat] means $1 is_at_least_length_of p;
	A1: ex m being Nat st P[m] by Lm1;
	ex k st P[k] & for n st P[n] holds k<=n from NAT_1:sch 5(A1);
	then consider k such that
	A2: k is_at_least_length_of p & for n st n is_at_least_length_of p holds k<=n;
	take k;
	thus thesis by A2,ORDINAL1:def 12;
	end;
	uniqueness
	proof let k,l be Element of NAT;
	assume k is_at_least_length_of p & ( for m st m is_at_least_length_of p
	holds k<= m) & l is_at_least_length_of p & for m st m is_at_least_length_of p
	holds l <=m;
	then k<=l & l<=k;
	hence thesis by XXREAL_0:1;
	end;
	end;

	::$CT 7

	theorem Th1:
	i>=len p implies p.i=0.R
	proof
	assume
	A1: i>=len p;
	len p is_at_least_length_of p by Def3;
	hence thesis by A1;
	end;

	theorem Th2:
	(for i st i < k holds p.i<>0.R) implies len p>=k
	proof
	assume
	A1: for i st i < k holds p.i<>0.R;
	for i st i<k holds len p>i
	proof
	let i;
	assume i<k;
	then p.i<>0.R by A1;
	hence thesis by Th1;
	end;
	hence thesis;
	end;

	theorem Th3:
	len p=k+1 implies p.k<>0.R
	proof
	assume
	A1: len p=k+1;
	then k<len p by XREAL_1:29;
	then not k is_at_least_length_of p by Def3;
	then consider i such that
	A2: i>=k and
	A3: p.i<>0.R;
	i<k+1 by A1,A3,Th1;
	then i<=k by NAT_1:13;
	hence thesis by A2,A3,XXREAL_0:1;
	end;

	scheme
	AlgSeqLambdaF{R()->non empty ZeroStr,A()->Nat, F(Nat)->Element of R()}: ex p
	being AlgSequence of R() st len p <= A() & for k st k < A() holds p.k=F(k)
	proof
	defpred P[Nat, Element of R()] means $1<A() & $2=F($1) or $1>=A() & $2=0.R();
	A1: for x being Element of NAT ex y being Element of R() st P[x,y]
	proof
	let x be Element of NAT;
	x <A() implies x < A() & (F(x)) = F(x);
	hence thesis;
	end;
	ex f being sequence of the carrier of R() st for x being Element of
	NAT holds P[x,f.x] from FUNCT_2:sch 3(A1);
	then consider f being sequence of the carrier of R() such that
	A2: for x being Element of NAT holds x<A()&f.x=F(x) or x>=A()&f.x=0.R();
	ex n st for i st i >= n holds f.i = 0.R()
	proof
	reconsider n=A() as Element of NAT by ORDINAL1:def 12;
	take n;
	let i;
	i in NAT by ORDINAL1:def 12;
	hence thesis by A2;
	end;
	then reconsider f as AlgSequence of R() by Def1;
	take f;
	now
	let i;
	assume
	A3: i>=A();
	i in NAT by ORDINAL1:def 12;
	hence f.i=0.R() by A2,A3;
	end;
	then A() is_at_least_length_of f;
	hence len f <= A() by Def3;
	let k;
	k in NAT by ORDINAL1:def 12;
	hence thesis by A2;
	end;

	::$CT

	theorem Th4:
	len p = len q & (for k st k < len p holds p.k = q.k) implies p=q
	proof
	assume that
	A1: len p = len q and
	A2: for k st k < len p holds p.k = q.k;
	A3: for x being object st x in NAT holds p.x=q.x
	proof
	let x be object;
	assume x in NAT;
	then reconsider k=x as Element of NAT;
	k >= len p implies p.k = q.k
	proof
	assume
	A4: k >= len p;
	then p.k = 0.R by Th1;
	hence thesis by A1,A4,Th1;
	end;
	hence thesis by A2;
	end;
	dom p = NAT & dom q = NAT by FUNCT_2:def 1;
	hence thesis by A3,FUNCT_1:2;
	end;

	theorem
	the carrier of R <> {0.R} implies for k ex p being AlgSequence of R st
	len p = k
	proof
	set D = the carrier of R;
	assume D <> {0.R};
	then consider t being object such that
	A1: t in D and
	A2: t <> 0.R by ZFMISC_1:35;
	reconsider y=t as Element of R by A1;
	let k;
	deffunc F(Nat) = y;
	consider p being AlgSequence of R such that
	A3: len p <= k & for i st i < k holds p.i=F(i) from AlgSeqLambdaF;
	for i st i < k holds p.i<>0.R by A2,A3;
	then len p >= k by Th2;
	hence thesis by A3,XXREAL_0:1;
	end;

	::
	:: The Short AlgSequence of R
	::

	reserve x for Element of R;

	definition
	::$CD
	let R,x;
	func <%x%> -> AlgSequence of R means
	:Def4:
	len it <= 1 & it.0 = x;
	existence
	proof
	deffunc F(Nat) = x;
	consider p such that
	A1: len p <= 1 & for k st k < 1 holds p.k=F(k) from AlgSeqLambdaF;
	take p;
	thus thesis by A1;
	end;
	uniqueness
	proof
	let p,q such that
	A2: len p <= 1 and
	A3: p.0 = x and
	A4: len q <= 1 and
	A5: q.0 = x;
	A6: 1 = 0 + 1;
	A7: now
	assume
	A8: x=0.R;
	then len p<1 by A2,A3,A6,Th3,XXREAL_0:1;
	then
	A9: len p=0 by NAT_1:14;
	len q<1 by A4,A5,A6,A8,Th3,XXREAL_0:1;
	hence len p=len q by A9,NAT_1:14;
	end;
	A10: for k st k < len p holds p.k = q.k
	proof
	let k;
	assume k<len p;
	then k<1 by A2,XXREAL_0:2;
	then k=0 by NAT_1:14;
	hence thesis by A3,A5;
	end;
	now
	assume
	A11: x<>0.R;
	then len p=1 by A2,A3,A6,Th1,NAT_1:8;
	hence len p=len q by A4,A5,A6,A11,Th1,NAT_1:8;
	end;
	hence thesis by A7,A10,Th4;
	end;
	end;

	Lm2: p=<%0.R%> implies len p = 0
	proof
	assume p=<%0.R%>;
	then
	A1: p.0=0.R & len p<=1 by Def4;
	0+1=1;
	then len p<1 by A1,Th3,XXREAL_0:1;
	hence thesis by NAT_1:14;
	end;

	theorem Th6:
	p=<%0.R%> iff len p = 0
	proof
	thus p=<%0.R%> implies len p = 0 by Lm2;
	thus len p=0 implies p=<%0.R%>
	proof
	assume len p=0;
	then len p=len <%0.R%> & for k st k < len p holds p.k = <%0.R%>.k
	by Lm2,NAT_1:2;
	hence thesis by Th4;
	end;
	end;

	::$CT

	theorem Th7:
	<%0.R%>.i=0.R
	proof
	set p0=<%0.R%>;
	now
	assume i<>0;
	then i>0 by NAT_1:3;
	then i>=len p0 by Th6;
	hence thesis by Th1;
	end;
	hence thesis by Def4;
	end;

	theorem
	p=<%0.R%> iff rng p = {0.R}
	proof
	thus p=<%0.R%> implies rng p= {0.R}
	proof
	assume
	A1: p=<%0.R%>;
	thus rng p c= {0.R}
	proof
	let x be object;
	assume x in rng p;
	then consider i being object such that
	A2: i in dom p and
	A3: x = p.i by FUNCT_1:def 3;
	reconsider i as Element of NAT by A2,FUNCT_2:def 1;
	p.i=0.R by A1,Th7;
	hence thesis by A3,TARSKI:def 1;
	end;
	thus {0.R} c= rng p
	proof
	let x be object;
	assume x in {0.R};
	then x = 0.R by TARSKI:def 1;
	then
	A4: p.0 = x by A1,Def4;
	dom p = NAT by FUNCT_2:def 1;
	hence thesis by A4,FUNCT_1:def 3;
	end;
	end;
	thus rng p={0.R} implies p=<%0.R%>
	proof
	assume
	A5: rng p={0.R};
	A6: for k st k>=0 holds p.k=0.R
	proof
	let k;
	k in NAT by ORDINAL1:def 12;
	then k in dom p by FUNCT_2:def 1;
	then p.k in rng p by FUNCT_1:def 3;
	hence thesis by A5,TARSKI:def 1;
	end;
	for m st m is_at_least_length_of p holds 0<=m by NAT_1:2;
	then len p=0 by A6,Def2,Def3;
	hence thesis by Th6;
	end;
	end;