Interface Ring<T>

All Superinterfaces:

Group, Group.Additive<T>, Operation, Operation.Addition<T>, Operation.Multiplication<T>

All Known Subinterfaces:

Field<T>, PolynomialFunction<N>, Scalar<N>, SelfDeclaringScalar<S>

All Known Implementing Classes:

AbstractPolynomial, Amount, BigScalar, ComplexNumber, ExactDecimal, Money, PolynomialC128, PolynomialQ128, PolynomialR032, PolynomialR064, PolynomialR128, PolynomialR256, Price, PrimitiveScalar, Quadruple, Quantity, Quaternion, RationalNumber, ScalarPolynomial

public interface Ring<T>
extends Group.Additive<T>, Operation.Multiplication<T>

A ring is a commutative group (addition operation) with a second binary operation (multiplication) that is distributive over the commutative group operation and is associative. Note that multiplications is not required to be commutative.

See Also:

• Ring
• Distributive property
• Associative property

Nested Class Summary

Nested classes/interfaces inherited from interface Group

Group.Additive<T>, Group.Multiplicative<T>

Nested classes/interfaces inherited from interface Operation

Operation.Addition<T>, Operation.Division<T>, Operation.Multiplication<T>, Operation.Subtraction<T>

Method Summary

Methods inherited from interface Group.Additive

negate

Methods inherited from interface Operation.Addition

add

Methods inherited from interface Operation.Multiplication

multiply, power