φ-(k,n)-absorbing and φ-(k,n)-absorbing primary hyperideals in a krasner (m,n)-hyperring

Abstract

Various expansions of prime hyperideals have been studied in a Krasner (m,n)-hyperring R. For instance, a proper hyperideal Q of R is called weakly (k,n)-absorbing primary provided that for r1kn-k+1 ∈ R, g(r1kn-k+1) ∈ Q-\0\ implies that there are (k-1)n-k+2 of the ri,s whose g-product is in Q g(r1(k-1)n-k+2) ∈ Q or a g-product of (k-1)n-k+2 of ri,s ,except g(r1(k-1)n-k+2), is in r(m,n)(Q). In this paper, we aim to extend the notions to the concepts of φ-(k,n)-absorbing and φ-(k,n)-absorbing primary hyperideals. Assume that φ is a function from HI(R) to HI(R) \\ such that HI(R) is the set of hyperideals of R and k is a positive integer. We call a proper hyperideal Q of R a φ-(k,n)-absorbing primary hyperideal if for r1kn-k+1 ∈ R, g(r1kn-k+1) ∈ Q-φ(Q) implies that there are (k-1)n-k+2 of the ri,s whose g-product is in Q g(r1(k-1)n-k+2) ∈ Q or a g-product of (k-1)n-k+2 of ri,s ,except g(r1(k-1)n-k+2), is in r(m,n)(Q). Several properties and characterizations of them are presented.