n-absorbing I-prime hyperideals in multiplicative hyperrings

Abstract

In this paper, we define the concept I-prime hyperideal in a multiplicative hyperring R. A proper hyperideal P of R is an I-prime hyperideal if for a, b ∈ R with ab ⊂eq P-IP implies a ∈ P or b ∈ P. We provide some characterizations of I-prime hyperideals. Also we conceptualize and study the notions 2-absorbing I-prime and n-absorbing I-prime hyperideals into multiplicative hyperrings as generalizations of prime ideals. A proper hyperideal P of a hyperring R is an n-absorbing I-prime hyperideal if for x1, ·s,xn+1 ∈ R such that x1 ·s xn+1 ⊂eq P-IP, then x1 ·s xi-1 xi+1 ·s xn+1 ⊂eq P for some i ∈ \1, ·s ,n+1\. We study some properties of such generalizations. We prove that if P is an I-prime hyperideal of a hyperring R, then each of PJ, S-1 P, f(P), f-1(P), P and P[x] are I-prime hyperideals under suitable conditions and suitable hyperideal I, where J is a hyperideal contains in P. Also, we characterize I-prime hyperideals in the decomposite hyperrings. Moreover, we show that the hyperring with finite number of maximal hyperideals in which every proper hyperideal is n-absorbing I-prime is a finite product of hyperfields.