\DOC ACCEPT_TAC \TYPE {ACCEPT_TAC : thm_tactic} \SYNOPSIS Solves a goal if supplied with the desired theorem (up to alpha-conversion). \KEYWORDS tactic. \DESCRIBE {ACCEPT_TAC} maps a given theorem {th} to a tactic that solves any goal whose conclusion is alpha-convertible to the conclusion of {th}. \FAILURE {ACCEPT_TAC th (A ?- g)} fails if the term {g} is not alpha-convertible to the conclusion of the supplied theorem {th}. \EXAMPLE The theorem {BOOL_CASES_AX = |- !t. (t <=> T) \/ (t <=> F)} can be used to solve the goal: { # g `!x. (x <=> T) \/ (x <=> F)`;; } \noindent by { # e(ACCEPT_TAC BOOL_CASES_AX);; val it : goalstack = No subgoals } \USES Used for completing proofs by supplying an existing theorem, such as an axiom, or a lemma already proved. Often this can simply be done by rewriting, but there are times when greater delicacy is wanted. \SEEALSO MATCH_ACCEPT_TAC. \ENDDOC