(projectively coresolved) Gorenstein flat modules over tensor rings

Abstract

Let TR(M) be a tensor ring, where R is a ring and M is an N-nilpotent R-bimodule. Under certain conditions, we characterize projectively coresolved Gorenstein flat modules over TR(M), showing that a TR(M) module (X,u) is projectively coresolved Gorenstein flat if and only if u is monomorphic and coker(u) is a projectively coresolved Gorenstein flat R-module. A class of Gorenstein at modules over TR(M) are also explicitly described. We discuss applications to trivial ring extensions and Morita context rings.

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