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I tried to prove this lemma with the tatics [intros], [apply], [assumption], [destruct],[left], [right], [split] but failed. Can anyone teach me how to prove it?

Lemma a : (P \/ Q) /\ ~P -> Q.
proof.


And generally, how to prove the easy propositions such as false->P, P/~P, etc?

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See also How to do cases with an inductive type in Coq, which discusses a different but related lemma –  Gilles Oct 10 '12 at 21:38
    
@cachuanghu please note that although it is not necessary, it is customary, and you'll get a couple of reputation points, if you mark an answer that is good enough for you as "accepted". Your comment indicates that you found your way through your difficulty. If none of the answers here contained your way, you may feel free to write your own answer and mark it as "accepted". An accepted answer will be helpful to people like me who are still learning some of these Coq tactics. –  minopret Nov 11 '12 at 16:47
    
Sorry for that. I have voted for the accepted answer. And is there any thing else should i do? –  cachuanghu Dec 1 '12 at 14:13
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4 Answers

up vote 5 down vote accepted

The tactic that you are missing is contradiction, which is used in order to prove goals containing contradictory hypotheses. Because you aren't permitted to use contradiction, I believe the lemma you are intended to apply is the induction principle for False. After doing so, you can apply the negated proposition and close the branch by assumption. Note that you can do better than your instructor requested, and use none of the listed tactics! The proof term for disjunctive syllogism is relatively easy to write:

Definition dis_syllogism (P Q : Prop) (H : (P ∨ Q) ∧ ¬P) : Q :=
  match H with
    | conj H₁ H₂ =>
      match H₁ with
      | or_introl H₃ => False_ind Q (H₂ H₃)
      | or_intror H₃ => H₃
      end
  end.
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or also, prove the theorem using tactics, and then simply "Print" it to figure out what it is. –  Kristopher Micinski Oct 8 '12 at 2:03
    
well the tactic would be apply (False_ind Q (H₂ H₃)), so it's the same thing; but you need to figure out how to write proof terms eventually if you want to start using dependent types well, so propositional logic is a good starting point. –  danportin Oct 8 '12 at 2:05
    
yes, and "contradiction," etc.., will also build this same term, I believe. (Worth noting, even if you use a tactic which seems "simpler," where you can see apply False as being low level, it will still build the same proof term under the covers.) –  Kristopher Micinski Oct 8 '12 at 2:11
    
well contradiction is the simplest way, and you already gave a standard proof that didn't use built-in decision procedures; but the op wanted a proof using only the listed tactics, so i translated the use of contradiction into a "lower-level" construct. –  danportin Oct 8 '12 at 2:15
    
I don't disagree with you at all! I think it's important to see the connection, that's all. It's great to have both solutions, and yours is more appropriate than mine wrt the machinery! Apologies if I seemed not to agree with you, I just think it's important to see that these two methods are one and the same! –  Kristopher Micinski Oct 8 '12 at 2:18
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To prove all these easy things, you have the family of tactics tauto, rtauto, intuition and firstorder.

I believe they are all stronger than tauto, which is a complete decision procedure for intuitionistic propositional logic.

Then, intuition allows you to put in some hints and lemmas to use, and firstorder can reason about first-order inductives.

More details in the doc of course, but these are the kind of tactics you want to use on such goals.

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Tks. I have found the solution. –  cachuanghu Oct 3 '12 at 16:32
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Section Example.

  (* Introduce some hypotheses.. *)
  Hypothesis P Q : Prop.

  Lemma a : (P \/ Q) /\ ~P -> Q.
    intros.
    inversion H.
    destruct H0.
      contradiction.
      assumption.
  Qed.

End Example.
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Remember that ~P means P->False, and inverting a False hypothesis finishes the goal (since False has no constructors). So you really just need apply and inversion.

Lemma a : forall (P Q:Prop), (P \/ Q) /\ ~P -> Q.
Proof.
  intros. 
  inversion H.
  inversion H0.
  - apply H1 in H2.  (* applying ~P on P gives H2: False *)
    inversion H2.
  - apply H2.
Qed.
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