\( \newcommand{\E}{\mathrm{E}} \) \( \newcommand{\A}{\mathrm{A}} \) \( \newcommand{\R}{\mathrm{R}} \) \( \newcommand{\N}{\mathrm{N}} \) \( \newcommand{\Q}{\mathrm{Q}} \) \( \newcommand{\Z}{\mathrm{Z}} \) \( \def\ccSum #1#2#3{ \sum_{#1}^{#2}{#3} } \def\ccProd #1#2#3{ \sum_{#1}^{#2}{#3} }\)
CGAL 4.11.3 - Algebraic Foundations
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AlgebraicStructureTraits_::DivMod Concept Reference

Definition

AdaptableFunctor computes both integral quotient and remainder of division with remainder. The quotient \( q\) and remainder \( r\) are computed such that \( x = q*y + r\) and \( |r| < |y|\) with respect to the proper integer norm of the represented ring. For integers this norm is the absolute value. For univariate polynomials this norm is the degree. In particular, \( r\) is chosen to be \( 0\) if possible. Moreover, we require \( q\) to be minimized with respect to the proper integer norm.

Note that the last condition is needed to ensure a unique computation of the pair \( (q,r)\). However, an other option is to require minimality for \( |r|\), with the advantage that a mod(x,y) operation would return the unique representative of the residue class of \( x\) with respect to \( y\), e.g. \( mod(2,3)\) should return \( -1\). But this conflicts with nearly all current implementation of integer types. From there, we decided to stay conform with common implementations and require \( q\) to be computed as \( x/y\) rounded towards zero.

The following table illustrates the behavior for integers:


x y q r

3 3 1 0
2 3 0 2
1 3 0 1
0 3 0 0
-1 3 0 -1
-2 3 0 -2
-3 3 -1 0


x y q r

3 -3 -1 0
2 -3 0 2
1 -3 0 1
0 -3 0 0
-1 -3 0 -1
-2 -3 0 -2
-3 -3 1 0

Refines:
AdaptableFunctor
See Also
AlgebraicStructureTraits
AlgebraicStructureTraits_::Mod
AlgebraicStructureTraits_::Div

Types

typedef unspecified_type result_type
 Is void.
 
typedef unspecified_type first_argument_type
 Is AlgebraicStructureTraits::Type.
 
typedef unspecified_type second_argument_type
 Is AlgebraicStructureTraits::Type.
 
typedef unspecified_type third_argument_type
 Is AlgebraicStructureTraits::Type&.
 
typedef unspecified_type fourth_argument_type
 Is AlgebraicStructureTraits::Type&.
 

Operations

result_type operator() (first_argument_type x, second_argument_type y, third_argument_type q, fourth_argument_type r)
 computes the quotient \( q\) and remainder \( r\), such that \( x = q*y + r\) and \( r\) minimal with respect to the Euclidean Norm on Type.
 
template<class NT1 , class NT2 >
result_type operator() (NT1 x, NT2 y, third_argument_type q, fourth_argument_type r)
 This operator is defined if NT1 and NT2 are ExplicitInteroperable with coercion type AlgebraicStructureTraits::Type.