GELANGGANG ARTIN

Abstract: A nonempty set R is said to be a ring if we can dene two binary operations in R, denoted by + and  respectively, such that for all a; b; c 2 R, R is an Abelian group under addition, closed under multiplication, and satisfy the associative law under multiplication and distributive law. Let R be a ring. R is an Artin ring if every nonempty set of ideals has the minimal element. In this paper, the Artin ring and some characteristics of it will be discussed.
Kata Kunci: Artin ring, prim ideal, maximal ideal, nilradikal
Penulis: IMELDA FAUZIAH, NOVA NOLIZA BAKAR, ZULAKMAL
Kode Jurnal: jpmatematikadd130138

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