Separated monic correspondence of cotorsion pairs and semi-Gorenstein-projective modules

Abstract

Given a finite dimensional algebra A over a field k, and a finite acyclic quiver Q, let = Ak kQ/I, where kQ is the path algebra of Q over k and I is a monomial ideal. We show that ( X, Y) is a (complete) hereditary cotorsion pair in A-mod if and only if ( smon(Q,I, X), rep(Q,I, Y)) is a (complete) hereditary cotorsion pair in -mod. We also show that A is left weakly Gorenstein if and only if so is . Provided that kQ/I is non-semisimple, the category of semi-Gorenstein-projective -modules coincides with the category of separated monic representations smon(Q,I,A) if and only if A is left weakly Gorenstein.