Additive map

id: additive-map-234-10518329
title: Additive map
text: In algebra, an additive map, Z -linear map or additive function is a function f that preserves the addition operation: for every pair of elements x and y in the domain of f . For example, any linear map is additive. When the domain is the real numbers, this is Cauchy's functional equation. For a specific case of this definition, see additive polynomial. More formally, an additive map is a Z -module homomorphism. Since an abelian group is a Z -module, it may be defined as a group homomorphism bet
brand slug: wiki
category slug: encyclopedia
description: Z-module homomorphism
original url: https://en.wikipedia.org/wiki/Additive_map
date created:
date modified: 2023-02-01T20:13:29Z
main entity: {"identifier":"Q22963169","url":"https://www.wikidata.org/entity/Q22963169"}
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fields total: 13
integrity: 14

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