Relative derived equivalences and relative Igusa-Todorov dimensions

Abstract

Let A be an Artin algebra and F a non-zero subfunctor of A1(-,-). In this paper, we characterize the relative φ-dimension of A by the bi-functor F1(-,-). Furthermore, we show that the finiteness of relative φ-dimension of an Artin algebra is invariant under relative derived equivalence. More precisely, for an Artin algebra A, assume that F has enough projectives and injectives, such that there exists G∈ A such that G= P(F), where P(F) is the category of all F-projecitve A-modules. If T is a relative tilting complex over A with term length t(T) such that B=(T), then we have F(A)-t(T)≤ (B)≤F(A)+t(T)+2.

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