If you have
A /\ B /\ C as an assumption, and your goal is
(A /\ B) /\ C, you can use the tactic
tauto. This tactic solves all tautologies in the propositional calculus. There is also a tactic
firstorder which can solve some formulas with quantifiers.
If you have
A /\ B /\ C and you'd like to pass
(A /\ B) /\ C as an argument to a lemma, you'll need to work a bit more. One method is to set
(A /\ B) /\ C as an intermediate goal and prove it:
assert ((A /\ B) /\ C). tauto.
C are large expressions, you can use a compound tactic to match over the hypothesis
H : A /\ B /\ C and apply the tauto tactic to it. This is a heavy-handed approach, overkill in this case, but useful in more complex situations where you want to automate a proof with many similar cases.
match type of H with ?x /\ ?y /\ ?z =>
assert (x /\ (y /\ z)); [tauto | clear H]
There's an easier way, which is to apply a known lemma that performs the transformation.
apply and_assoc in H.
You can find the lemma by browsing the library documentation. You can also search for it. This isn't the easiest lemma to search for because it's an equivalence and the search tools are geared towards implications and equalities. You can use
SearchPattern (_ /\ _ /\ _). to look for lemmas of the form
forall x1 … xn, ?A /\ ?B /\ ?C (where
?C can be any expression). You can use
SearchRewrite (_ /\ _ /\ _) to look for lemmas of the form
forall x1 … xn, (?A /\ ?B /\ ?C) = ?D. Unfortunately, this doesn't find what we're after, which is a lemma of the form
forall x1 … xn, (?A /\ ?B /\ ?C) <-> ?D. What does work is
Coq < SearchPattern (_ <-> (_ /\ _ /\ _))
and_assoc: forall A B C : Prop, (A /\ B) /\ C <-> A /\ B /\ C