The Existence of Maximal n-Orthogonal Subcategories

Abstract

For an (n-1)-Auslander algebra with global dimension n, we give some necessary conditions for admitting a maximal (n-1)-orthogonal subcategory in terms of the properties of simple -modules with projective dimension n-1 or n. For an almost hereditary algebra with global dimension 2, we prove that admits a maximal 1-orthogonal subcategory if and only if for any non-projective indecomposable -module M, M is injective is equivalent to that the reduced grade of M is equal to 2. We give a connection between the Gorenstein Symmetric Conjecture and the existence of maximal n-orthogonal subcategories of T for a cotilting module T. For a Gorenstein algebra, we prove that all non-projective direct summands of a maximal n-orthogonal module are nτ-periodic. In addition, we study the relation between the complexity of modules and the existence of maximal n-orthogonal subcategories for the tensor product of two finite-dimensional algebras.