Characterizing S-projective modules and S-semisimple rings by uniformity

Abstract

Let R be a ring and S a multiplicative subset of R. An R-module P is called uniformly S-projective provided that the induced sequence 0→ HomR(P,A)→ HomR(P,B)→ HomR(P,C)→ 0 is u-S-exact for any u-S-short exact sequence 0→ A→ B→ C→ 0. Some characterizations and properties of u-S-projective modules are obtained. The notion of u-S-semisimple modules is also introduced. A ring R is called a u-S-semisimple ring provided that any free R-module is u-S-semisimple. Several characterizations of u-S-semisimple rings are provided in terms of u-S-semisimple modules, u-S-projective modules, u-S-injective modules and u-S-split u-S-exact sequences.

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