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How do you prove: forall m n : Z, m < n -> m -n < O in Coq? Many Thanks!

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I don't really like the edited title, but at least it doesn't look like random keyboard mashing now .. try for "something in English" for a title. –  user166390 Nov 1 '12 at 5:20
    
Thank you for your editing! –  WuZhu Nov 1 '12 at 5:24
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1 Answer

up vote 1 down vote accepted

If you just care about proving it, and not about the proof, just use omega:

Require Import Omega.

Goal forall m n : Z, (m < n)%Z -> (m - n < 0%Z)%Z.
intros. omega.
Qed.

If you have to prove this as part of exercises, or a homework, it is not too hard if you rely on some existing proofs.

For instance, you can combine these guys:

Zminus_diag_reverse
     : forall n : Z, 0%Z = (n - n)%Z

Zplus_lt_le_compat
     : forall n m p q : Z, (n < m)%Z -> (p <= q)%Z -> (n + p < m + q)%Z

There are definitely more than one way to do it, and it is not a very hard goal if you use some existing lemmas.

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Problem has solved. Thanks! –  WuZhu Nov 1 '12 at 12:17
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