Strongly tilting truncated path algebras

Abstract

For any truncated path algebra , we give a structural description of the modules in the categories P<∞(-mod) and P<∞(-Mod), consisting of the finitely generated (resp. arbitrary) -modules of finite projective dimension. We deduce that these categories are contravariantly finite in -mod and -Mod, respectively, and determine the corresponding minimal P<∞-approximation of an arbitrary -module from a projective presentation. In particular, we explicitly construct - based on the Gabriel quiver Q and the Loewy length of - the basic strong tilting module T (in the sense of Auslander and Reiten) which is coupled with P<∞(-mod) in the contravariantly finite case. A main topic is the study of the homological properties of the corresponding tilted algebra = End(T)op, such as its finitistic dimensions and the structure of its modules of finite projective dimension. In particular, we characterize, in terms of a straightforward condition on Q, the situation where the tilting module T is strong over as well. In this --symmetric situation, we obtain sharp results on the submodule lattices of the objects in P<∞(Mod-), among them a certain heredity property; it entails that any module in P<∞(Mod-) is an extension of a projective module by a module all of whose simple composition factors belong to P<∞(mod-).