[−][src]Trait alga::general::AbstractQuasigroup
A quasigroup is a magma which that has the divisibility property (or Latin square property). A set with a closed binary operation with the divisibility property.
Divisibility is a weak form of right and left invertibility.
Divisibility or Latin square property
∀ a, b ∈ Self, ∃! r, l ∈ Self such that l ∘ a = b and a ∘ r = b
The solution to these equations can be written as
r = a \ b and l = b / a
where "" and "/" are respectively the left and right division.
Provided methods
fn prop_inv_is_latin_square_approx(args: (Self, Self)) -> bool where
Self: RelativeEq,
Self: RelativeEq,
Returns true
if latin squareness holds for the given arguments. Approximate
equality is used for verifications.
a ~= a / b ∘ b && a ~= a ∘ b / b
fn prop_inv_is_latin_square(args: (Self, Self)) -> bool where
Self: Eq,
Self: Eq,
Returns true
if latin squareness holds for the given arguments.
a == a / b * b && a == a * b / b
Implementations on Foreign Types
impl<N> AbstractQuasigroup<Multiplicative> for Complex<N> where
N: Num + Clone + ClosedNeg,
[src]
N: Num + Clone + ClosedNeg,
impl<N> AbstractQuasigroup<Additive> for Complex<N> where
N: AbstractGroupAbelian<Additive>,
[src]
N: AbstractGroupAbelian<Additive>,