Move towards base-n expansions (#112)

Fields/CauchyCompletion/Ring.agda

@@ -16,7 +16,7 @@ open import Numbers.Naturals.Semiring
 open import Numbers.Naturals.Order
 open import Rings.Homomorphisms.Definition
 
-module Fields.CauchyCompletion.Ring {m n o : _} {A : Set m} {S : Setoid {m} {n} A} {_+_ : A → A → A} {_*_ : A → A → A} {_<_ : Rel {m} {o} A} {pOrder : SetoidPartialOrder S _<_} {R : Ring S _+_ _*_} {pRing : PartiallyOrderedRing R pOrder} (order : TotallyOrderedRing pRing) (F : Field R) (charNot2 : Setoid._∼_ S ((Ring.1R R) + (Ring.1R R)) (Ring.0R R) → False) where
+module Fields.CauchyCompletion.Ring {m n o : _} {A : Set m} {S : Setoid {m} {n} A} {_+_ : A → A → A} {_*_ : A → A → A} {_<_ : Rel {m} {o} A} {pOrder : SetoidPartialOrder S _<_} {R : Ring S _+_ _*_} {pRing : PartiallyOrderedRing R pOrder} (order : TotallyOrderedRing pRing) (F : Field R) where
 
 open Setoid S
 open SetoidTotalOrder (TotallyOrderedRing.total order)
@@ -28,10 +28,10 @@ open Group (Ring.additiveGroup R)
 
 open import Rings.Orders.Total.Lemmas order
 open import Fields.CauchyCompletion.Definition order F
-open import Fields.CauchyCompletion.Multiplication order F charNot2
-open import Fields.CauchyCompletion.Addition order F charNot2
-open import Fields.CauchyCompletion.Setoid order F charNot2
-open import Fields.CauchyCompletion.Group order F charNot2
+open import Fields.CauchyCompletion.Multiplication order F
+open import Fields.CauchyCompletion.Addition order F
+open import Fields.CauchyCompletion.Setoid order F
+open import Fields.CauchyCompletion.Group order F
 
 private
   abstract