On multiplication fs-modules and dimension symmetry

Abstract

In this paper, we first study fs-modules, i.e., modules with finitely many small submodules. We show that every fs-module with finite hollow dimension is Noetherian. Also, we prove that an R-module M with finite Goldie dimension, is an fs-module if and only if M = M1 M2, where M1 is semisimple and M2 is an fs-module with Soc(M2) M. Then, we investigate multiplication fs-modules over commutative rings and show that R is an fs-ring if and only if every multiplication R-module is an fs-module. In particular, we prove that the lattices of R-submodules of M and S-submodules of M are coincide, where S=EndR(M). Consequently, MR and SM have the same dimension of Krull (Noetherian, Goldie and hollow). Further, we prove that for any self-generator multiplication module M, to be an fs-module as a right R-module and as a left S-module are equivalent.