diff options
author | glondu <glondu@85f007b7-540e-0410-9357-904b9bb8a0f7> | 2009-09-17 15:58:14 +0000 |
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committer | glondu <glondu@85f007b7-540e-0410-9357-904b9bb8a0f7> | 2009-09-17 15:58:14 +0000 |
commit | 61ccbc81a2f3b4662ed4a2bad9d07d2003dda3a2 (patch) | |
tree | 961cc88c714aa91a0276ea9fbf8bc53b2b9d5c28 /test-suite/failure/universes-buraliforti.v | |
parent | 6d3fbdf36c6a47b49c2a4b16f498972c93c07574 (diff) |
Delete trailing whitespaces in all *.{v,ml*} files
git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12337 85f007b7-540e-0410-9357-904b9bb8a0f7
Diffstat (limited to 'test-suite/failure/universes-buraliforti.v')
-rw-r--r-- | test-suite/failure/universes-buraliforti.v | 8 |
1 files changed, 4 insertions, 4 deletions
diff --git a/test-suite/failure/universes-buraliforti.v b/test-suite/failure/universes-buraliforti.v index d18d21195..1f96ab34a 100644 --- a/test-suite/failure/universes-buraliforti.v +++ b/test-suite/failure/universes-buraliforti.v @@ -47,7 +47,7 @@ End Inverse_Image. Section Burali_Forti_Paradox. - Definition morphism (A : Type) (R : A -> A -> Prop) + Definition morphism (A : Type) (R : A -> A -> Prop) (B : Type) (S : B -> B -> Prop) (f : A -> B) := forall x y : A, R x y -> S (f x) (f y). @@ -55,7 +55,7 @@ Section Burali_Forti_Paradox. assumes there exists an universal system of notations, i.e: - A type A0 - An injection i0 from relations on any type into A0 - - The proof that i0 is injective modulo morphism + - The proof that i0 is injective modulo morphism *) Variable A0 : Type. (* Type_i *) Variable i0 : forall X : Type, (X -> X -> Prop) -> A0. (* X: Type_j *) @@ -68,7 +68,7 @@ Section Burali_Forti_Paradox. (* Embedding of x in y: x and y are images of 2 well founded relations R1 and R2, the ordinal of R2 being strictly greater than that of R1. *) - Record emb (x y : A0) : Prop := + Record emb (x y : A0) : Prop := {X1 : Type; R1 : X1 -> X1 -> Prop; eqx : x = i0 X1 R1; @@ -152,7 +152,7 @@ Defined. End Subsets. - Definition fsub (a b : A0) (H : emb a b) (x : sub a) : + Definition fsub (a b : A0) (H : emb a b) (x : sub a) : sub b := Build_sub _ (witness _ x) (emb_trans _ _ _ (emb_wit _ x) H). (* F is a morphism: a < b => F(a) < F(b) |