idempotent
English
Etymology
Latin roots, idem (“same”) + potent (“having power”) – literally, “having the same power”.
Coined 1870 by American mathematician Benjamin Peirce in context of algebra.[1]
Pronunciation
- (US) IPA(key): /aɪdəmˈpoʊtənt/, /ɪdəmˈpoʊtənt/
Adjective
idempotent (not comparable)
- (mathematics, computing) Said of a function: describing an action which, when performed multiple times on the same subject, has no further effect on its subject after the first time it is performed.
- A projection operator is idempotent.
- (mathematics) Said of an element of an algebraic structure with a binary operation (such as a group or semigroup): when the element operates on itself, the result is equal to itself.
- Every finite semigroup has an idempotent element.
- Every group has a unique idempotent element: namely, its identity element.
- (mathematics) Said of a binary operation: that all of the distinct elements it can operate on are idempotent (in the sense given just above).
- Since the AND logical operator is commutative, associative, and idempotent, then it distributes with respect to itself.
- (mathematics) Said of an algebraic structure: having an idempotent operation (in the sense above).
Usage notes
See the Usage notes section of nullipotent.
Coordinate terms
Related terms
Translations
mathematics: an action which, when performed multiple time, has no further effect on its subject after the first time it is performed
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mathematics: Said of an element of an algebraic structure with a binary operation: that when the element operates on itself, the result is equal to itself
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Said of a binary operation: that all of the distinct elements it can operate on are idempotent
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Noun
idempotent (plural idempotents)
- (mathematics) An idempotent element.
- (mathematics) An idempotent structure.
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