Tilting mutation for m-replicated algebras

Abstract

Let A be a finite dimensional hereditary algebra over an algebraically closed field k, A(m) be the m-replicated algebra of A and Cm(A) be the m-cluster category of A. We investigate properties of complements to a faithful almost complete tilting A(m)-module and prove that the m-cluster mutation in Cm(A) can be realized in mod A(m), which generalizes corresponding results on duplicated algebras established in [Z1].