Monic modules and semi-Gorenstein-projective modules

Abstract

The category gp() of Gorenstein-projective modules over tensor algebra = AkB can be described as the monomorphism category mon(B, gp(A)) of B over gp(A). In particular, Gorenstein-projective -modules are monic. In this paper, we find the similar relation between semi-Gorenstein-projective -modules and A-modules, via monic modules, namely, mon(B, \ A) = mon(B, A) \ . Using this, it is proved that if A is weakly Gorenstein, then is weakly Gorenstein if and only each semi-Gorenstein-projective -modules are monic; and that if B = kQ with Q a finite acyclic quiver, then is weakly Gorenstein if and only if A is weakly Gorenstein. However, this relation itself does not answer the question whether there exist double semi-Gorenstein-projective -modules which are not monic. Using the recent discovered examples of double semi-Gorenstein-projective A-modules which are not torsionless, we positively answer this question, by explicitly constructing a class of double semi-Gorenstein-projective T2(A)-modules with one parameter such that they are not monic, and hence not torsionless. The corresponding results are obtained also for the monic modules and semi-Gorenstein-projective modules over the triangular matrix algebras given by bimodules.