Idempotence: Difference between revisions

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In [[mathematics]] '''idempotence''' is the property of an [[operation (mathematics)|operation]] that repeated application has no effect.   
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In [[mathematics]] and [[computer science]] '''idempotence''' is the property of an operation that repeated application has no further effect.   
 
==In mathematics==


A [[binary operation]] <math>\star</math> is ''idempotent'' if
A [[binary operation]] <math>\star</math> is ''idempotent'' if
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equivalently, every element is an [[idempotent element]] for <math>\star</math>.
equivalently, every element is an [[idempotent element]] for <math>\star</math>.


Examples of idempotent binary operations include [[join]] and [[meet]] in a [[lattice (order)|lattice]].
Examples of idempotent binary operations include [[join]] and [[meet]] in a [[lattice (order)|lattice]]; [[union]] and [[intersection]] on [[set (mathematics)|sets]]; [[disjunction]] and [[Conjunction (logical and)|conjunction]] in [[propositional logic]].
 
A [[unary operation]] (a [[function (mathematics)|function]] from a set to itself) π is idempotent if it is an idempotent element for [[function composition]], <math>\pi \circ \pi = \pi</math>.
 
==In computing==
 
In applications such as [[database]]s and [[transaction processing]], idempotent operations are those for which the intended effect is that repeated application should have no effect, such as inserting a [[record]] into a [[file]], an element into a [[set (mathematics)|set]], or sending a message. Implementations must therefore be constructed in such a way that the intended effect is actually carried into practice. For example, messages might have unique sequence numbers with duplicates being discarded on receipt; a set might be implemented as a bit vector, and member [[insertion]] implemented by an idempotent mathematical operation such as [[inclusive or]] with a bit mask.


A [[unary operation]] (function from a set to itself) π is idempotent if it is an idempotent element for [[function composition]], π<sup>2</sup> = π.
When a particular unit of work (i.e., transaction), has the idempotent property, relaxation of the [[ACID properties]] usually required for reliable transaction processing, can be relaxed.[[Category:Suggestion Bot Tag]]

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In mathematics and computer science idempotence is the property of an operation that repeated application has no further effect.

In mathematics

A binary operation is idempotent if

for all x:

equivalently, every element is an idempotent element for .

Examples of idempotent binary operations include join and meet in a lattice; union and intersection on sets; disjunction and conjunction in propositional logic.

A unary operation (a function from a set to itself) π is idempotent if it is an idempotent element for function composition, .

In computing

In applications such as databases and transaction processing, idempotent operations are those for which the intended effect is that repeated application should have no effect, such as inserting a record into a file, an element into a set, or sending a message. Implementations must therefore be constructed in such a way that the intended effect is actually carried into practice. For example, messages might have unique sequence numbers with duplicates being discarded on receipt; a set might be implemented as a bit vector, and member insertion implemented by an idempotent mathematical operation such as inclusive or with a bit mask.

When a particular unit of work (i.e., transaction), has the idempotent property, relaxation of the ACID properties usually required for reliable transaction processing, can be relaxed.