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use crate::algebra::group::{AbelianGroup, CommutativeMonoid, Monoid, Semigroup};
use crate::operators::{
Additive, ClosedAdd, ClosedMul, ClosedNeg, ClosedRem, ClosedSub, Multiplicative, Operator,
};
use crate::properties::archimedean::ArchimedeanDiv;
use crate::properties::bezout::Bezout;
use crate::properties::euclidean::EuclideanDiv;
use crate::properties::factorization::Factorizable;
use crate::properties::gcd::GCD;
use crate::properties::general::NonZero;
use crate::properties::primality::Primality;
pub trait DivisionRing<A: Operator = Additive, M: Operator = Multiplicative>:
AbelianGroup<A> + AbelianGroup<M>
{
}
pub trait CommutativeRing<A: Operator = Additive, M: Operator = Multiplicative>:
AbelianGroup<A> + CommutativeMonoid<M>
{
}
pub trait Ring<A: Operator = Additive, M: Operator = Multiplicative>:
AbelianGroup<A> + Monoid<M>
{
}
pub trait Semiring<A: Operator = Additive, M: Operator = Multiplicative>:
CommutativeMonoid<A> + Monoid<M>
{
}
pub trait CommutativeSemiring<A: Operator = Additive, M: Operator = Multiplicative>:
CommutativeMonoid<A> + CommutativeMonoid<M>
{
}
pub trait NearRing<A: Operator = Additive, M: Operator = Multiplicative>:
Monoid<A> + Semigroup<M>
{
}
pub trait Domain<A: Operator = Additive, M: Operator = Multiplicative>:
Ring<A, M> + NonZero
{
}
pub trait IntegralDomain<A: Operator = Additive, M: Operator = Multiplicative>:
CommutativeRing<A, M> + NonZero
{
}
pub trait GCDDomain<A: Operator = Additive, M: Operator = Multiplicative>:
IntegralDomain<A, M> + GCD
{
}
pub trait BezoutDomain<A: Operator = Additive, M: Operator = Multiplicative>:
GCDDomain<A, M> + Bezout
{
}
pub trait UFDDomain<A: Operator = Additive, M: Operator = Multiplicative>:
GCDDomain<A, M> + Factorizable
{
}
pub trait PIDDomain<A: Operator = Additive, M: Operator = Multiplicative>:
UFDDomain<A, M> + BezoutDomain<A, M>
{
}
pub trait EuclideanDomain<A: Operator = Additive, M: Operator = Multiplicative>:
PIDDomain<A, M> + EuclideanDiv
{
}
pub trait Semidomain<A: Operator = Additive, M: Operator = Multiplicative>:
Semiring<A, M> + NonZero
{
}
pub trait IntegralSemidomain<A: Operator = Additive, M: Operator = Multiplicative>:
CommutativeSemiring<A, M> + NonZero
{
}
pub trait GCDSemidomain<A: Operator = Additive, M: Operator = Multiplicative>:
IntegralSemidomain<A, M> + GCD
{
}
pub trait BezoutSemidomain<A: Operator = Additive, M: Operator = Multiplicative>:
GCDSemidomain<A, M> + Bezout
{
}
pub trait UFDSemidomain<A: Operator = Additive, M: Operator = Multiplicative>:
GCDSemidomain<A, M> + Factorizable
{
}
pub trait PIDSemidomain<A: Operator = Additive, M: Operator = Multiplicative>:
UFDSemidomain<A, M> + BezoutSemidomain<A, M>
{
}
pub trait EuclideanSemidomain<A: Operator = Additive, M: Operator = Multiplicative>:
PIDSemidomain<A, M> + EuclideanDiv
{
}
pub trait NaturalCommutativeSemiring:
EuclideanSemidomain + ClosedAdd + ClosedMul + ClosedRem + Primality + ArchimedeanDiv + Eq + Ord
{
}
pub trait IntegerRing:
EuclideanDomain
+ ClosedAdd
+ ClosedSub
+ ClosedMul
+ ClosedRem
+ ClosedNeg
+ Primality
+ ArchimedeanDiv
+ Eq
+ Ord
{
}
impl<T> NearRing for T where T: Monoid<Additive> + Semigroup<Multiplicative> {}
impl<T> Semiring for T where T: CommutativeMonoid<Additive> + Monoid<Multiplicative> {}
impl<T> CommutativeSemiring for T where
T: CommutativeMonoid<Additive> + CommutativeMonoid<Multiplicative>
{
}
impl<T> Ring for T where T: AbelianGroup<Additive> + Monoid<Multiplicative> {}
impl<T> CommutativeRing for T where T: AbelianGroup<Additive> + CommutativeMonoid<Multiplicative> {}
impl<T> DivisionRing for T where T: AbelianGroup<Additive> + AbelianGroup<Multiplicative> {}
impl<T> Domain for T where T: Ring + NonZero {}
impl<T> IntegralDomain for T where T: CommutativeRing + NonZero {}
impl<T> GCDDomain for T where T: IntegralDomain + GCD {}
impl<T> BezoutDomain for T where T: GCDDomain + Bezout {}
impl<T> UFDDomain for T where T: GCDDomain + Factorizable {}
impl<T> PIDDomain for T where T: UFDDomain + BezoutDomain {}
impl<T> EuclideanDomain for T where T: PIDDomain + EuclideanDiv {}
impl<T> Semidomain for T where T: Semiring + NonZero {}
impl<T> IntegralSemidomain for T where T: CommutativeSemiring + NonZero {}
impl<T> GCDSemidomain for T where T: IntegralSemidomain + GCD {}
impl<T> BezoutSemidomain for T where T: GCDSemidomain + Bezout {}
impl<T> UFDSemidomain for T where T: GCDSemidomain + Factorizable {}
impl<T> PIDSemidomain for T where T: UFDSemidomain + BezoutSemidomain {}
impl<T> EuclideanSemidomain for T where T: PIDSemidomain + EuclideanDiv {}
impl<T> NaturalCommutativeSemiring for T where
T: EuclideanSemidomain
+ ClosedAdd
+ ClosedMul
+ ClosedRem
+ Primality
+ ArchimedeanDiv
+ Eq
+ Ord
{
}
impl<T> IntegerRing for T where
T: EuclideanDomain
+ ClosedAdd
+ ClosedSub
+ ClosedMul
+ ClosedRem
+ ClosedNeg
+ Primality
+ ArchimedeanDiv
+ Eq
+ Ord
{
}