| Safe Haskell | Safe-Inferred |
|---|
Data.Group
Documentation
class Monoid m => Group m whereSource
A Group is a Monoid plus a function, invert, such that:
a <> invert a == mempty
invert a <> a == mempty
Instances
| Group () | |
| Group a => Group (Dual a) | |
| Num a => Group (Sum a) | |
| Fractional a => Group (Product a) | |
| Group b => Group (a -> b) | |
| (Group a, Group b) => Group (a, b) | |
| (Group a, Group b, Group c) => Group (a, b, c) | |
| (Group a, Group b, Group c, Group d) => Group (a, b, c, d) | |
| (Group a, Group b, Group c, Group d, Group e) => Group (a, b, c, d, e) |
class Group g => Abelian g Source
Instances
| Abelian () | |
| Abelian a => Abelian (Dual a) | |
| Num a => Abelian (Sum a) | |
| Fractional a => Abelian (Product a) | |
| Abelian b => Abelian (a -> b) | |
| (Abelian a, Abelian b) => Abelian (a, b) | |
| (Abelian a, Abelian b, Abelian c) => Abelian (a, b, c) | |
| (Abelian a, Abelian b, Abelian c, Abelian d) => Abelian (a, b, c, d) | |
| (Abelian a, Abelian b, Abelian c, Abelian d, Abelian e) => Abelian (a, b, c, d, e) |