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Line 1: In [[number theory]], an '''additive function''' is an [[arithmetic function]] ''f''(''n'') of the positive [[integer]] ''n'' such that whenever ''a'' and ''b'' are [[coprime]], wethe ~~have~~function of the product is the sum of the functions:▼ ~~Different definitions exist depending on the specific field of application. Traditionally, an '''additive function''' is a function that preserves the addition operation:~~ :''f''(''x''+''y'') = ''f''(''x'')+''f''(''y''). ▼ ▲In [[number theory]], an '''additive function''' is an [[arithmetic function]] ''f''(''n'') of the positive [[integer]] ''n'' such that whenever ''a'' and ''b'' are [[coprime]] we have: :''f''(''ab'') = ''f''(''a'') + ''f''(''b''). An additive function may also refer to an [[additive polynomial]]. In this case, ''f'' is taken to be a function on a [[field (mathematics)\|field]], and additivity is taken to be the property that ▲:''f''(''x''+''y'') = ''f''(''x'')+''f''(''y''). for any two elements ''x'' and ''y'' of the field. This article covers only the first definition; see the article [[additive polynomial]] for the second. Note also that any [[homomorphism]] ''f'' between [[Abelian group]]s is "additive" by the second definition. == Completely additive ==

Additive function: Difference between revisions