On φ-n-absorbing primary ideals of commutative rings

Abstract

All rings are commutative with 1 and n is a positive integer. Let φ: J(R) J(R) be a function where J(R) denotes the set of all ideals of R. We say that a proper ideal I of R is φ-n-absorbing primary if whenever a1,a2,...,an+1∈ R and a1a2·s an+1∈ Iφ(I), either a1a2·s an∈ I or the product of an+1 with (n-1) of a1,...,an is in I. The aim of this paper is to investigate the concept of φ-n-absorbing primary ideals.