S-1-absorbing primary submodules
Abstract
In this work, we introduce the notion of S-1-absorbing primary submodule as an extension of 1-absorbing primary submodule. Let S be a multiplicatively closed subset of a ring R and M be an R-module. A submodule N of M with (N:RM) S= is said to be S-1-absorbing primary if whenever abm∈ N for some non-unit a,b∈ R and m∈ M, then either sab∈(N:RM) or sm∈ M-rad(N). We examine several properties of this concept and provide some characterizations. In addition, S-1-absorbing primary avoidance theorem and S -1-absorbing primary property for idealization and amalgamation are presented.
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