Commutative monoid: Difference between revisions

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Definition

A monoid in which all elements commute is called a commutative monoid. That is, a commutative monoid satisfies $a b = b a$ for all $a, b$ in the monoid.

Related notions

Weaker than

For a monoid with all elements invertible, i.e. a group, the related notion is an abelian group.

Examples

Any abelian group.

The additive monoid of natural numbers.

The multiplicative monoid of non-zero integers.

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	* The [[additive monoid of natural numbers]].		* The [[additive monoid of natural numbers]].

			* The [[multiplicative monoid of non-zero integers]].