# Function composition/Related Articles

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*See also changes related to Function composition, or pages that link to Function composition or to this page or whose text contains "Function composition".*

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- Associativity [r]: A property of an algebraic operation such as multiplication: a(bc) = (ab)c.
^{[e]} - Chain (mathematics) [r]:
*Add brief definition or description* - Composition (mathematics) [r]:
*Add brief definition or description* - Conjugation (group theory) [r]: The elements of any group that may be partitioned into conjugacy classes.
^{[e]} - Entire function [r]: is a function that is holomorphic in the whole complex plane.
^{[e]} - Function (mathematics) [r]: A rule which maps each object in a given set to a uniquely defined object in another set.
^{[e]} - Group (mathematics) [r]: Set with a binary associative operation such that the operation admits an identity element and each element of the set has an inverse element for the operation.
^{[e]} - Idempotence [r]: The property of an operation that repeated application has no effect.
^{[e]} - Isogeny [r]: Morphism of varieties between two abelian varieties (e.g. elliptic curves) that is surjective and has a finite kernel.
^{[e]} - Monoid [r]: An algebraic structure with an associative binary operation and an identity element.
^{[e]} - Power series [r]: An infinite series whose terms involve successive powers of a variable, typically with real or complex coefficients.
^{[e]} - Relation (mathematics) [r]: A property which holds between certain elements of some set or sets.
^{[e]} - Relation composition [r]: Formation of a new relation S o R from two given relations R and S, having as its most well-known special case the composition of functions.
^{[e]} - Symmetric group [r]: The group of all permutations of a set, that is, of all invertible maps from a set to itself.
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