Definition

AdaptableBinaryFunction providing an integral division.

Integral division (a.k.a. exact division or division without remainder) maps ring elements \( (x,y)\) to ring element \( z\) such that \( x = yz\) if such a \( z\) exists (i.e. if \( x\) is divisible by \( y\)). Otherwise the effect of invoking this operation is undefined. Since the ring represented is an integral domain, \( z\) is uniquely defined if it exists.

Refines:: AdaptableBinaryFunction

See also: AlgebraicStructureTraits; AlgebraicStructureTraits_::Divides

Types
typedef unspecified_type	result_type
	Is `AlgebraicStructureTraits::Type`.

typedef unspecified_type	first_argument
	Is `AlgebraicStructureTraits::Type`.

typedef unspecified_type	second_argument
	Is `AlgebraicStructureTraits::Type`.

Operations
result_type	operator() (first_argument_type x, second_argument_type y)
	returns \( x/y\), this is an integral division.

template<class NT1 , class NT2 >
result_type	operator() (NT1 x, NT2 y)
	This operator is defined if `NT1` and `NT2` are `ExplicitInteroperable` with coercion type `AlgebraicStructureTraits::Type`.

Definition

Types

Operations