Finitistic dimension conjecture and relative hereditary algebras

Abstract: We introduce the notion of relative hereditary Artin algebras, as a generalization of algebras with representation dimension at most 3. We prove the following results. (1) The relative hereditariness of an Artin algebra is left-right symmetric and is inherited by endomorphism algebras of projective modules. (2) The finitistic dimensions of a relative hereditary algebra and its opposite algebra are finite. As a consequence, the finitistic projective dimension conjecture, the finitistic injective dimension conje… Show more

“…In [23], we call an artin algebra R relatively hereditary provided that there is an R-module V ∈ modR such that, for any M ∈ modR, there is an exact sequence 0 →…”

Derived invariance by syzygy complexes

“…In [23], we call an artin algebra R relatively hereditary provided that there is an R-module V ∈ modR such that, for any M ∈ modR, there is an exact sequence 0 →…”

Derived invariance by syzygy complexes

The derived dimensions and representation distances of Artin algebras

Semi-tilting Modules and Mutation