The `EuclideanRing`

concept represents a commutative `Ring`

that can also be endowed with a division algorithm.

A Ring defines a binary operation often called *multiplication* that can be used to combine two elements of the ring into a new element of the ring. An Euclidean ring, also called an Euclidean domain, adds the ability to define a special function that generalizes the Euclidean division of integers.

However, an Euclidean ring must also satisfy one more property, which is that of having no non-zero zero divisors. In a Ring `(R, +, *)`

, it follows quite easily from the axioms that `x * 0 == 0`

for any ring element `x`

. However, there is nothing that mandates `0`

to be the only ring element sending other elements to `0`

. Hence, in some Rings, it is possible to have elements `x`

and `y`

such that `x * y == 0`

while not having `x == 0`

nor `y == 0`

. We call these elements divisors of zero, or zero divisors. For example, this situation arises in the Ring of integers modulo 4 (the set `{0, 1, 2, 3}`

) with addition and multiplication `mod 4`

as binary operations. In this case, we have that

2 * 2 == 4

== 0 (mod 4)

even though `2 != 0 (mod 4)`

.

Following this line of thought, an Euclidean ring requires its only zero divisor is zero itself. In other words, the multiplication in an Euclidean won't send two non-zero elements to zero. Also note that since multiplication in a `Ring`

is not necessarily commutative, it is not always the case that

x * y == 0 implies y * x == 0

To be rigorous, we should then distinguish between elements that are zero divisors when multiplied to the right and to the left. Fortunately, the concept of an Euclidean ring requires the Ring multiplication to be commutative. Hence,

x * y == y * x

and we do not have to distinguish between left and right zero divisors.

Typical examples of Euclidean rings include integers and polynomials over a field. The method names used here refer to the Euclidean ring of integers under the usual addition, multiplication and division operations.

`div`

and `mod`

satisfying the laws below

To simplify the reading, we will use the `+`

, `*`

, `/`

and `%`

operators with infix notation to denote the application of the corresponding methods in Monoid, Group, Ring and EuclideanRing. For all objects `a`

and `b`

of an `EuclideanRing`

`R`

, the following laws must be satisfied:

a * b == b * a // commutativity

(a / b) * b + a % b == a if b is non-zero

zero<R>() % b == zero<R>() if b is non-zero

`Monoid`

, `Group`

, `Ring`

A data type `T`

is integral if `std::is_integral<T>::value`

is true. For a non-boolean integral data type `T`

, a model of `EuclideanRing`

is automatically defined by using the `Ring`

model provided for arithmetic data types and setting

- Note
- The rationale for not providing an EuclideanRing model for
`bool`

is the same as for not providing Monoid, Group and Ring models.

## Variables | |

constexpr auto | boost::hana::div |

Generalized integer division. More... | |

constexpr auto | boost::hana::mod |

Generalized integer modulus.Given two elements of an EuclideanRing `x` and `y` , with `y` nonzero, `mod` returns the modulus of the division of `x` by `y` . In other words, `mod` can be seen as an equivalent to `%` . More... | |

constexpr auto boost::hana::div |

`#include <boost/hana/fwd/div.hpp>`

= [](auto&& x, auto&& y) -> decltype(auto) {

return tag-dispatched;

}

Generalized integer division.

The `div`

method is "overloaded" to handle distinct data types with certain properties. Specifically, `div`

is defined for *distinct* data types `A`

and `B`

such that

`A`

and`B`

share a common data type`C`

, as determined by the`common`

metafunction`A`

,`B`

and`C`

are all`EuclideanRing`

s when taken individually`to<C> : A -> B`

and`to<C> : B -> C`

are`Ring`

-embeddings, as determined by the`is_embedding`

metafunction.

In that case, the `div`

method is defined as

// Copyright Louis Dionne 2013-2017

// Distributed under the Boost Software License, Version 1.0.

// (See accompanying file LICENSE.md or copy at http://boost.org/LICENSE_1_0.txt)

#include <boost/hana/assert.hpp>

#include <boost/hana/div.hpp>

#include <boost/hana/equal.hpp>

#include <boost/hana/integral_constant.hpp>

namespace hana = boost::hana;

BOOST_HANA_CONSTANT_CHECK(hana::div(hana::int_c<6>, hana::int_c<3>) == hana::int_c<2>);

BOOST_HANA_CONSTANT_CHECK(hana::div(hana::int_c<6>, hana::int_c<4>) == hana::int_c<1>);

static_assert(hana::div(6, 3) == 2, "");

static_assert(hana::div(6, 4) == 1, "");

int main() { }

constexpr auto boost::hana::mod |

`#include <boost/hana/fwd/mod.hpp>`

= [](auto&& x, auto&& y) -> decltype(auto) {

return tag-dispatched;

}

Generalized integer modulus.Given two elements of an EuclideanRing `x`

and `y`

, with `y`

nonzero, `mod`

returns the modulus of the division of `x`

by `y`

. In other words, `mod`

can be seen as an equivalent to `%`

.

The `mod`

method is "overloaded" to handle distinct data types with certain properties. Specifically, `mod`

is defined for *distinct* data types `A`

and `B`

such that

`A`

and`B`

share a common data type`C`

, as determined by the`common`

metafunction`A`

,`B`

and`C`

are all`EuclideanRing`

s when taken individually`to<C> : A -> B`

and`to<C> : B -> C`

are`Ring`

-embeddings, as determined by the`is_embedding`

metafunction.

In that case, `mod`

is defined as

// Copyright Louis Dionne 2013-2017

// Distributed under the Boost Software License, Version 1.0.

// (See accompanying file LICENSE.md or copy at http://boost.org/LICENSE_1_0.txt)

#include <boost/hana/assert.hpp>

#include <boost/hana/equal.hpp>

#include <boost/hana/integral_constant.hpp>

#include <boost/hana/mod.hpp>

namespace hana = boost::hana;

BOOST_HANA_CONSTANT_CHECK(hana::mod(hana::int_c<6>, hana::int_c<4>) == hana::int_c<2>);

BOOST_HANA_CONSTANT_CHECK(hana::mod(hana::int_c<-6>, hana::int_c<4>) == hana::int_c<-2>);

static_assert(hana::mod(6, 4) == 2, "");

int main() { }