English

Finitistic Dimension Conjectures via Gorenstein Projective Dimension

Representation Theory 2020-06-04 v1 Rings and Algebras

Abstract

It is a well-known result of Auslander and Reiten that contravariant finiteness of the class Pfin\mathcal{P}^{\mathrm{fin}}_\infty (of finitely generated modules of finite projective dimension) over an Artin algebra is a sufficient condition for validity of finitistic dimension conjectures. Motivated by the fact that finitistic dimensions of an algebra can alternatively be computed by Gorenstein projective dimension, in this work we examine the Gorenstein counterpart of Auslander--Reiten condition, namely contravariant finiteness of the class GPfin\mathcal{GP}^{\mathrm{fin}}_\infty (of finitely generated modules of finite Gorenstein projective dimension), and its relation to validity of finitistic dimension conjectures. It is proved that contravariant finiteness of the class GPfin\mathcal{GP}^{\mathrm{fin}}_\infty implies validity of the second finitistic dimension conjecture over left artinian rings. In the more special setting of Artin algebras, however, it is proved that the Auslander--Reiten sufficient condition and its Gorenstein counterpart are virtually equivalent in the sense that contravariant finiteness of the class GPfin\mathcal{GP}^{\mathrm{fin}}_\infty implies contravariant finiteness of the class Pfin\mathcal{P}^{\mathrm{fin}}_\infty over any Artin algebra, and the converse holds for Artin algebras over which the class GP0fin\mathcal{GP}^{\mathrm{fin}}_0 (of finitely generated Gorenstein projective modules) is contravariantly finite.

Keywords

Cite

@article{arxiv.2006.02182,
  title  = {Finitistic Dimension Conjectures via Gorenstein Projective Dimension},
  author = {Pooyan Moradifar and Jan Šaroch},
  journal= {arXiv preprint arXiv:2006.02182},
  year   = {2020}
}

Comments

19 pages; comments welcome

R2 v1 2026-06-23T16:01:24.993Z