diff options
Diffstat (limited to 'theories/Numbers')
| -rw-r--r-- | theories/Numbers/BinNums.v | 3 | ||||
| -rw-r--r-- | theories/Numbers/Cyclic/Int31/Int31.v | 1 | ||||
| -rw-r--r-- | theories/Numbers/Integer/Abstract/ZDivEucl.v | 1 | ||||
| -rw-r--r-- | theories/Numbers/Integer/NatPairs/ZNatPairs.v | 6 | ||||
| -rw-r--r-- | theories/Numbers/NatInt/NZDomain.v | 4 |
5 files changed, 13 insertions, 2 deletions
diff --git a/theories/Numbers/BinNums.v b/theories/Numbers/BinNums.v index 3ba9d1f5ed..7b6740e94b 100644 --- a/theories/Numbers/BinNums.v +++ b/theories/Numbers/BinNums.v @@ -23,6 +23,7 @@ Inductive positive : Set := | xO : positive -> positive | xH : positive. +Declare Scope positive_scope. Delimit Scope positive_scope with positive. Bind Scope positive_scope with positive. Arguments xO _%positive. @@ -37,6 +38,7 @@ Inductive N : Set := | N0 : N | Npos : positive -> N. +Declare Scope N_scope. Delimit Scope N_scope with N. Bind Scope N_scope with N. Arguments Npos _%positive. @@ -53,6 +55,7 @@ Inductive Z : Set := | Zpos : positive -> Z | Zneg : positive -> Z. +Declare Scope Z_scope. Delimit Scope Z_scope with Z. Bind Scope Z_scope with Z. Arguments Zpos _%positive. diff --git a/theories/Numbers/Cyclic/Int31/Int31.v b/theories/Numbers/Cyclic/Int31/Int31.v index 39af62c32f..d91bfd4e2c 100644 --- a/theories/Numbers/Cyclic/Int31/Int31.v +++ b/theories/Numbers/Cyclic/Int31/Int31.v @@ -50,6 +50,7 @@ Inductive int31 : Type := I31 : digits31 int31. Register digits as int31 bits in "coq_int31" by True. Register int31 as int31 type in "coq_int31" by True. +Declare Scope int31_scope. Delimit Scope int31_scope with int31. Bind Scope int31_scope with int31. Local Open Scope int31_scope. diff --git a/theories/Numbers/Integer/Abstract/ZDivEucl.v b/theories/Numbers/Integer/Abstract/ZDivEucl.v index d7f25a6613..ab17bb6e1a 100644 --- a/theories/Numbers/Integer/Abstract/ZDivEucl.v +++ b/theories/Numbers/Integer/Abstract/ZDivEucl.v @@ -46,6 +46,7 @@ Module ZEuclidProp (** We put notations in a scope, to avoid warnings about redefinitions of notations *) + Declare Scope euclid. Infix "/" := D.div : euclid. Infix "mod" := D.modulo : euclid. Local Open Scope euclid. diff --git a/theories/Numbers/Integer/NatPairs/ZNatPairs.v b/theories/Numbers/Integer/NatPairs/ZNatPairs.v index 4b2d5c13b5..995d96b314 100644 --- a/theories/Numbers/Integer/NatPairs/ZNatPairs.v +++ b/theories/Numbers/Integer/NatPairs/ZNatPairs.v @@ -13,15 +13,18 @@ Require Import NSub ZAxioms. Require Export Ring. +Declare Scope pair_scope. +Local Open Scope pair_scope. + Notation "s #1" := (fst s) (at level 9, format "s '#1'") : pair_scope. Notation "s #2" := (snd s) (at level 9, format "s '#2'") : pair_scope. -Local Open Scope pair_scope. Module ZPairsAxiomsMod (Import N : NAxiomsMiniSig) <: ZAxiomsMiniSig. Module Import NProp. Include NSubProp N. End NProp. +Declare Scope NScope. Delimit Scope NScope with N. Bind Scope NScope with N.t. Infix "==" := N.eq (at level 70) : NScope. @@ -73,6 +76,7 @@ Definition max (n m : t) : t := (max (n#1 + m#2) (m#1 + n#2), n#2 + m#2). End Z. +Declare Scope ZScope. Delimit Scope ZScope with Z. Bind Scope ZScope with Z.t. Infix "==" := Z.eq (at level 70) : ZScope. diff --git a/theories/Numbers/NatInt/NZDomain.v b/theories/Numbers/NatInt/NZDomain.v index 3d0c005fd1..acebfcf1d2 100644 --- a/theories/Numbers/NatInt/NZDomain.v +++ b/theories/Numbers/NatInt/NZDomain.v @@ -220,8 +220,10 @@ End NZDomainProp. Module NZOfNat (Import NZ:NZDomainSig'). Definition ofnat (n : nat) : t := (S^n) 0. -Notation "[ n ]" := (ofnat n) (at level 7) : ofnat. + +Declare Scope ofnat. Local Open Scope ofnat. +Notation "[ n ]" := (ofnat n) (at level 7) : ofnat. Lemma ofnat_zero : [O] == 0. Proof. |