Finitistic dimension and Endomorphism algebras of Gorenstein projective modules

Abstract

Let A be an Artin algebra, M be a Gorenstein projective A-module and B = EndA M, then M is a A-B-bimodule. We use the restricted flat dimension of MB to give a characterization of the homological dimensions of A and B, and obtain the following main results: (1) if A is a CM-finite algebra with GP(A) = addAE and fin.dim A ≥ 2, then fin.dim\ B ≤ fin.dim\ A + rfd(MB) + pdB HomA(M, E); (2) If A is a CM-finite n-Gorenstein algebra with GP(A) = addAE and n ≥ 2, then gl.dim B ≤ n + pdB HomA(M, E).