Convex subquivers and the finitistic dimension

Abstract

Let be a quiver and K a field. We study the interrelationship of homological properties of algebras associated to convex subquivers of and quotients of the path algebra K. We introduce the homological heart of which is a particularly nice convex subquiver of . For any algebra of the form K/I, the algebra associated to K/I and the homological heart have similar homological properties. We give an application showing that the finitistic dimension conjecture need only be proved for algebras with path connected quivers.