On Generalizations of Graded 2-absorbing and Graded 2-absorbing primary submodules

Abstract

Let R be a graded commutative ring with non-zero unity 1 and M be a graded unitary R-module. In this article, we introduce the concepts of graded φ-2-absorbing and graded φ-2-absorbing primary submodules as generalizations of the concepts of graded 2-absorbing and graded 2-absorbing primary submodules. Let GS(M) be the set of all graded R-submodules of M and φ: GS(M)→ GS(M)\\ be a function. A proper graded R-submodule K of M is said to be a graded φ-2-absorbing R-submodule of M if whenever x, y are homogeneous elements of R and m is a homogeneous element of M with xym∈ K-φ(K), then xm∈ K or ym∈ K or xy∈ (K :R M), and K is said to be a graded φ-2-absorbing primary R-submodule of M if whenever x, y are homogeneous elements of R and m is a homogeneous element of M with xym∈ K-φ(K), then xm or ym is in the graded radical of K or xy∈ (K:RM). We investigate several properties of these new types of graded submodules.