Modules of infinite projective dimension
Abstract
We characterize the modules of infinite projective dimension over the endomorphism algebras of Opperman-Thomas cluster tilting objects X in (n+2)-angulated categories ( C,n,). For an indecomposable object M of C, we define in this article the ideal IM of End C(nX) given by all endomorphisms that factor through add M, and show that the End C(X)-module Hom C(X,M) has infinite projective dimension precisely when IM is non-zero. As an application, we generalize a recent result by Beaudet-Br\"ustle-Todorov for cluster-tilted algebras.
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