Rem unused opens in Safe (#93)

2025-10-11 22:58:40 +00:00 · 2020-01-05 15:06:35 +00:00
parent 019a9d9a07
commit cbe55c9b56
169 changed files with 0 additions and 960 deletions
--- a/Modules/Definition.agda
+++ b/Modules/Definition.agda
@@ -1,15 +1,8 @@
 {-# OPTIONS --safe --warning=error --without-K #-}

-open import LogicalFormulae
-open import Groups.Groups
-open import Groups.Homomorphisms.Definition
 open import Groups.Definition
 open import Groups.Abelian.Definition
-open import Numbers.Naturals.Naturals
-open import Setoids.Orders
 open import Setoids.Setoids
-open import Functions
-open import Sets.EquivalenceRelations
 open import Rings.Definition

 open import Agda.Primitive using (Level; lzero; lsuc; _⊔_)
--- a/Modules/DirectSum.agda
+++ b/Modules/DirectSum.agda
@@ -1,19 +1,12 @@
 {-# OPTIONS --safe --warning=error --without-K #-}

 open import LogicalFormulae
-open import Groups.Groups
-open import Groups.Homomorphisms.Definition
 open import Groups.Definition
 open import Groups.Abelian.Definition
-open import Numbers.Naturals.Naturals
-open import Setoids.Orders
 open import Setoids.Setoids
-open import Functions
-open import Sets.EquivalenceRelations
 open import Rings.Definition
 open import Modules.Definition

-open import Agda.Primitive using (Level; lzero; lsuc; _⊔_)

 module Modules.DirectSum {a b : _} {A : Set a} {S : Setoid {a} {b} A} {_+R_ : A → A → A} {_*R_ : A → A → A} (R : Ring S _+R_ _*R_) {m n o p : _} {M : Set m} {T : Setoid {m} {n} M} {_+_ : M → M → M} {G' : Group T _+_} {G : AbelianGroup G'} {_·1_ : A → M → M} {N : Set o} {U : Setoid {o} {p} N} {_+'_ : N → N → N} {H' : Group U _+'_} {H : AbelianGroup H'} {_·2_ : A → N → N} (M1 : Module R G _·1_) (M2 : Module R H _·2_) where

--- a/Modules/Examples.agda
+++ b/Modules/Examples.agda
@@ -1,23 +1,15 @@
 {-# OPTIONS --safe --warning=error --without-K #-}

-open import LogicalFormulae
-open import Groups.Groups
 open import Groups.Abelian.Definition
-open import Groups.Homomorphisms.Definition
 open import Groups.Definition
 open import Groups.Abelian.Definition
-open import Numbers.Naturals.Naturals
 open import Numbers.Integers.Integers
-open import Setoids.Orders
 open import Setoids.Setoids
-open import Functions
 open import Sets.EquivalenceRelations
-open import Rings.Definition
 open import Modules.Definition
 open import Groups.Cyclic.Definition
 open import Groups.Cyclic.DefinitionLemmas

-open import Agda.Primitive using (Level; lzero; lsuc; _⊔_)

 module Modules.Examples where

--- a/Modules/Lemmas.agda
+++ b/Modules/Lemmas.agda
@@ -1,20 +1,13 @@
 {-# OPTIONS --safe --warning=error --without-K #-}

-open import LogicalFormulae
-open import Groups.Groups
-open import Groups.Homomorphisms.Definition
 open import Groups.Definition
 open import Groups.Lemmas
 open import Groups.Abelian.Definition
-open import Numbers.Naturals.Naturals
-open import Setoids.Orders
 open import Setoids.Setoids
-open import Functions
 open import Sets.EquivalenceRelations
 open import Rings.Definition
 open import Modules.Definition

-open import Agda.Primitive using (Level; lzero; lsuc; _⊔_)

 module Modules.Lemmas {a b : _} {A : Set a} {S : Setoid {a} {b} A} {_+R_ : A → A → A} {_*_ : A → A → A} {R : Ring S _+R_ _*_} {m n : _} {M : Set m} {T : Setoid {m} {n} M} {_+_ : M → M → M} {G' : Group T _+_} {G : AbelianGroup G'} {_·_ : A → M → M} (mod : Module R G _·_) where