diff options
Diffstat (limited to 'theories/Numbers/Cyclic/DoubleCyclic/DoubleType.v')
-rw-r--r-- | theories/Numbers/Cyclic/DoubleCyclic/DoubleType.v | 14 |
1 files changed, 7 insertions, 7 deletions
diff --git a/theories/Numbers/Cyclic/DoubleCyclic/DoubleType.v b/theories/Numbers/Cyclic/DoubleCyclic/DoubleType.v index 73fd266e4..3bd4b8127 100644 --- a/theories/Numbers/Cyclic/DoubleCyclic/DoubleType.v +++ b/theories/Numbers/Cyclic/DoubleCyclic/DoubleType.v @@ -37,10 +37,10 @@ Section Zn2Z. Variable znz : Type. - (** From a type [znz] representing a cyclic structure Z/nZ, + (** From a type [znz] representing a cyclic structure Z/nZ, we produce a representation of Z/2nZ by pairs of elements of [znz] - (plus a special case for zero). High half of the new number comes - first. + (plus a special case for zero). High half of the new number comes + first. *) Inductive zn2z := @@ -57,10 +57,10 @@ End Zn2Z. Implicit Arguments W0 [znz]. -(** From a cyclic representation [w], we iterate the [zn2z] construct - [n] times, gaining the type of binary trees of depth at most [n], - whose leafs are either W0 (if depth < n) or elements of w - (if depth = n). +(** From a cyclic representation [w], we iterate the [zn2z] construct + [n] times, gaining the type of binary trees of depth at most [n], + whose leafs are either W0 (if depth < n) or elements of w + (if depth = n). *) Fixpoint word (w:Type) (n:nat) : Type := |