Triangular Matrix Categories over path Categories and Quasi-hereditary Categories, as well as one point extensions by Projectives

Abstract

In this paper, we prove that the lower triangular matrix category = [ smallmatrix T&0\\ M&U smallmatrix ], where T and U are quasi-hereditary Hom-finite Krull-Schmidt K-categories and M is a UK Top-module that satisfies suitable conditions, is quasi-hereditary in the sense of LGOS1 and Martin. Moreover, we solve the problem of finding quotients of path categories isomorphic to the lower triangular matrix category , where T=KR/J and U=KQ/I are path categories of infinity quivers modulo admissible ideals. Finally, we study the case where is a path category of a quiver Q with relations and U is the full additive subcategory of obtained by deleting a source vertex * in Q and T=add \*\. We then show that there exists an adjoint pair of functors ( R, E) between the functor categories mod \ and mod \ U that preserve orthogonality and exceptionality; see Assem1. We then give some examples of how to extend classical tilting subcategories of U-modules to classical tilting subcategories of -modules.