commutative

Let $S$ be a set and $\\circ$ a binary operation on it. $\\circ$ is said to be commutative if

a\\circ b=b\\circ a

for all $a,b\\in S$ .

Viewing $\\circ$ as a function from $S\\times S$ to $S$ , the commutativity of $\\circ$ can be notated as

\\circ(a,b)=\\circ(b,a).

Some common examples of commutative operations are

•
addition over the integers: $m+n=m+n$ for all integers $m, n$
•
multiplication over the integers: $m\\cdot n=m\\cdot n$ for all integers $m, n$
•
addition over $n\\times n$ matrices, $A+B=B+A$ for all $n\\times n$ matrices $A, B$ , and
•
multiplication over the reals: $rs=sr$ , for all real numbers $r, s$ .

A binary operation that is not commutative is said to be non-commutative. A common example of a non-commutative operation is the subtraction over the integers (or more generally the real numbers). This means that, in general,

a-b\eq b-a.

For instance, $2-1=1\eq-1=1-2$ .

Other examples of non-commutative binary operations can be found in the attachment below.

Remark. The notion of commutativity can be generalized to $n$ -ary operations, where $n\\geq 2$ . An $n$ -ary operation $f$ on a set $A$ is said to be commutative if

f(a_{1},a_{2},\\ldots,a_{n})=f(a_{\\pi(1)},a_{\\pi(2)},\\ldots,a_{\\pi(n)})

for every permutation $\\pi$ on $\\{1,2,\\ldots,n\\}$ , and for every choice of $n$ elements $a_{i}$ of $A$ .

Title	commutative
Canonical name	Commutative
Date of creation	2013-03-22 12:22:45
Last modified on	2013-03-22 12:22:45
Owner	CWoo (3771)
Last modified by	CWoo (3771)
Numerical id	11
Author	CWoo (3771)
Entry type	Definition
Classification	msc 20-00
Synonym	commutativity
Synonym	commutative law
Related topic	Associative
Related topic	AbelianGroup2
Related topic	QuantumTopos
Related topic	NonCommutativeStructureAndOperation
Related topic	Subcommutative
Defines	non-commutative