PSTRIP_GOAL_THEN
PairRules.PSTRIP_GOAL_THEN : (thm_tactic -> tactic)
Splits a goal by eliminating one outermost connective, applying the given theorem-tactic to the antecedents of implications.
Given a theorem-tactic ttac and a goal (A,t), PSTRIP_GOAL_THEN
removes one outermost occurrence of one of the connectives !, ==>,
~ or /\ from the conclusion of the goal t. If t is a universally
quantified term, then STRIP_GOAL_THEN strips off the quantifier. Note
that PSTRIP_GOAL_THEN will strip off paired universal quantifications.
A ?- !p. u
============== PSTRIP_GOAL_THEN ttac
A ?- u[p'/p]
where p' is a primed variant that contains no variables that appear
free in the assumptions A. If t is a conjunction, then
PSTRIP_GOAL_THEN simply splits the conjunction into two subgoals:
A ?- v /\ w
================= PSTRIP_GOAL_THEN ttac
A ?- v A ?- w
If t is an implication "u ==> v" and if:
A ?- v
=============== ttac (u |- u)
A' ?- v'
then:
A ?- u ==> v
==================== PSTRIP_GOAL_THEN ttac
A' ?- v'
Finally, a negation ~t is treated as the implication t ==> F.
Failure
PSTRIP_GOAL_THEN ttac (A,t) fails if t is not a paired universally
quantified term, an implication, a negation or a conjunction. Failure
also occurs if the application of ttac fails, after stripping the
goal.
PSTRIP_GOAL_THEN is used when manipulating intermediate results
(obtained by stripping outer connectives from a goal) directly, rather
than as assumptions.
See also
PairRules.PGEN_TAC,
Tactic.STRIP_GOAL_THEN,
PairRules.FILTER_PSTRIP_THEN,
PairRules.PSTRIP_TAC,
PairRules.FILTER_PSTRIP_TAC