English

$n$-term silting complexes in $K^b(proj(\Lambda))$

Representation Theory 2022-10-11 v2

Abstract

Let Λ\Lambda be an Artin algebra and Kb(proj(Λ))K^b(proj(\Lambda)) be the triangulated category of bounded co-chain complexes in proj(Λ).proj(\Lambda). It is well known that two-terms silting complexes in Kb(proj(Λ))K^b(proj(\Lambda)) are described by the τ\tau-tilting theory. The aim of this paper is to give a characterization of certain nn-term silting complexes in Kb(proj(Λ))K^b(proj(\Lambda)) which are induced by Λ\Lambda-modules. In order to do that, we introduce the notions of τn\tau_n-rigid, τn\tau_n-tilting and τn,m\tau_{n,m}-tilting Λ\Lambda-modules. The latter is both a generalization of τ\tau-tilting and tilting in mod(Λ).mod(\Lambda). It is also stated and proved some variant, for τn\tau_n-tilting modules, of the well known Bazzoni's characterization for tilting modules. We give some connections between nn-terms presilting complexes in Kb(proj(Λ))K^b(proj(\Lambda)) and τn\tau_n-rigid Λ\Lambda-modules. Moreover, a characterization is given to know when a τn\tau_n-tilting Λ\Lambda-module is nn-tilting. We also study more deeply the properties of the τn,m\tau_{n,m}-tilting Λ\Lambda-modules and their connections of being mm-tilting in some quotient algebras. We apply the developed τn,m\tau_{n,m}-tilting theory to the finitistic dimension of Λ.\Lambda. Finally, at the end of the paper we discuss and state some open questions (conjectures) that we consider crucial for the future develop of the τn,m\tau_{n,m}-tilting theory.

Keywords

Cite

@article{arxiv.2206.11755,
  title  = {$n$-term silting complexes in $K^b(proj(\Lambda))$},
  author = {Luis Martinez and Octavio Mendoza},
  journal= {arXiv preprint arXiv:2206.11755},
  year   = {2022}
}
R2 v1 2026-06-24T12:01:57.343Z