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On iterated almost $ν$-stable derived equivalences

arXiv:0811.0926

Abstract

In a recent paper \cite{HuXi3}, we introduced a classes of derived equivalences called almost $ν$-stable derived equivalences. The most important property is that an almost $ν$-stable derived equivalence always induces a stable equivalence of Morita type, which generalizes a well-known result of Rickard: derived-equivalent self-injective algebras are stably equivalent of Morita type. In this paper, we shall consider the compositions of almost $ν$-stable derived equivalences and their quasi-inverses, which is called iterated almost $ν$-stable derived equivalences. We give a sufficient and necessary condition for a derived equivalence to be an iterated almost $ν$-stable derived equivalence, and give an explicit construction of the stable equivalence functor induced by an iterated almost $ν$-stable derived equivalence. As a consequence, we get some new sufficient conditions for a derived finite-dimensional algebras to induce a stable equivalence of Morita type.

17 pages