diff options
author | Enrico Tassi <gareuselesinge@debian.org> | 2015-01-25 14:43:16 +0100 |
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committer | Enrico Tassi <gareuselesinge@debian.org> | 2015-01-25 14:43:16 +0100 |
commit | f219abfed720305c13875c3c63f9240cf63f78bc (patch) | |
tree | 69d2c026916128fdb50b8d1c0dbf1be451340d30 /test-suite/bugs/closed/2996.v | |
parent | 476d60ef0fe0ac015c1e902204cdd7029e10ef0f (diff) | |
parent | cec4741afacd2e80894232850eaf9f9c0e45d6d7 (diff) |
Merge tag 'upstream/8.5_beta1+dfsg'
Upstream version 8.5~beta1+dfsg
Diffstat (limited to 'test-suite/bugs/closed/2996.v')
-rw-r--r-- | test-suite/bugs/closed/2996.v | 30 |
1 files changed, 30 insertions, 0 deletions
diff --git a/test-suite/bugs/closed/2996.v b/test-suite/bugs/closed/2996.v new file mode 100644 index 00000000..440cda61 --- /dev/null +++ b/test-suite/bugs/closed/2996.v @@ -0,0 +1,30 @@ +(* Test on definitions referring to section variables that are not any + longer in the current context *) + +Section x. + + Hypothesis h : forall(n : nat), n < S n. + + Definition f(n m : nat)(less : n < m) : nat := n + m. + + Lemma a : forall(n : nat), f n (S n) (h n) = 1 + 2 * n. + Proof. + (* XXX *) admit. + Qed. + + Lemma b : forall(n : nat), n < 3 + n. + Proof. + clear. + intros n. + Fail assert (H := a n). + Abort. + + Let T := True. + Definition p := I : T. + + Lemma paradox : False. + Proof. + clear. + set (T := False). + Fail pose proof p as H. + Abort. |