Suppose I have a very simple inductive type:
Inductive ind : Set := | ind0 : ind | ind1 : ind -> ind.
and I'd like to prove that certain values can't exist. Specifically, that there can't be non-well-founded values:
~exists i, i = ind1 i.
I've looked around a bit on the internet and came up with nothing. I was able to write:
Fixpoint depth (i : ind) : nat := match i with | ind0 => 0 | ind1 i2 => 1 + depth i2 end. Goal ~exists i, i = ind1 i. Proof. intro. inversion_clear H. remember (depth x) as d. induction d. rewrite H0 in Heqd; simpl in Heqd. discriminate. rewrite H0 in Heqd; simpl in Heqd. injection Heqd. assumption. Qed.
which works, but seems really ugly and non-general.