On compatibility of Koszul- and higher preprojective gradings

Abstract

We investigate compatibility of gradings for an almost Koszul or Koszul algebra R that is also the higher preprojective algebra n+1(A) of an n-hereditary algebra A. For an n-representation finite algebra A, we show that A must be Koszul if n+1(A) can be endowed with an almost Koszul grading. For an acyclic basic n-representation infinite algebra A, we show that A must be Koszul if n+1(A) can be endowed with a Koszul grading. From this we deduce that a higher preprojective grading of an (almost) Koszul algebra R = n+1(A) is, in both cases, isomorphic to a cut of the (almost) Koszul grading. Up to a further assumption on the tops of the degree 0 subalgebras for the different gradings, we also show a similar result without the basic assumption in the n-representation infinite case. As an application, we show that n-APR tilting preserves the property of being Koszul for n-representation infinite algebras.

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