singletons-2.0.0.1: A framework for generating singleton types

Copyright(C) 2013 Richard Eisenberg
LicenseBSD-style (see LICENSE)
MaintainerRichard Eisenberg (eir@cis.upenn.edu)
Stabilityexperimental
Portabilitynon-portable
Safe HaskellNone
LanguageHaskell2010

Data.Singletons.Decide

Contents

Description

Defines the class SDecide, allowing for decidable equality over singletons.

Synopsis

The SDecide class

class (kparam ~ KProxy) => SDecide kparam where Source

Members of the SDecide "kind" class support decidable equality. Instances of this class are generated alongside singleton definitions for datatypes that derive an Eq instance.

Methods

(%~) :: forall a b. Sing a -> Sing b -> Decision (a :~: b) Source

Compute a proof or disproof of equality, given two singletons.

Supporting definitions

data a :~: b :: k -> k -> * where infix 4

Propositional equality. If a :~: b is inhabited by some terminating value, then the type a is the same as the type b. To use this equality in practice, pattern-match on the a :~: b to get out the Refl constructor; in the body of the pattern-match, the compiler knows that a ~ b.

Since: 4.7.0.0

Constructors

Refl :: (:~:) k b b 

Instances

Category k ((:~:) k) 
TestCoercion k ((:~:) k a) 
TestEquality k ((:~:) k a) 
(~) k a b => Bounded ((:~:) k a b) 
(~) k a b => Enum ((:~:) k a b) 
Eq ((:~:) k a b) 
((~) * a b, Data a) => Data ((:~:) * a b) 
Ord ((:~:) k a b) 
(~) k a b => Read ((:~:) k a b) 
Show ((:~:) k a b) 

data Void :: *

Uninhabited data type

Since: 4.8.0.0

Instances

Eq Void 
Data Void 
Ord Void 
Read Void

Reading a Void value is always a parse error, considering Void as a data type with no constructors.

Show Void 
Ix Void 
Generic Void 
Exception Void 
type Rep Void = D1 D1Void V1 

type Refuted a = a -> Void Source

Because we can never create a value of type Void, a function that type-checks at a -> Void shows that objects of type a can never exist. Thus, we say that a is Refuted

data Decision a Source

A Decision about a type a is either a proof of existence or a proof that a cannot exist.

Constructors

Proved a

Witness for a

Disproved (Refuted a)

Proof that no a exists