English

Silting Modules over Triangular Matrix Rings

Representation Theory 2020-05-01 v2

Abstract

Let Λ,Γ\Lambda,\Gamma be rings and R=(Λ0MΓ)R=\left(\begin{array}{cc}\Lambda & 0 \\ M & \Gamma\end{array}\right) the triangular matrix ring with MM a (Γ,Λ)(\Gamma,\Lambda)-bimodule. Let XX be a right Λ\Lambda-module and YY a right Γ\Gamma-module. We prove that (X,0)(X, 0)\oplus(YΓM,Y)(Y\otimes_\Gamma M, Y) is a silting right RR-module if and only if both XΛX_{\Lambda} and YΓY_{\Gamma} are silting modules and YΓMY\otimes_\Gamma M is generated by XX. Furthermore, we prove that if Λ\Lambda and Γ\Gamma are finite dimensional algebras over an algebraically closed field and XΛX_{\Lambda} and YΓY_{\Gamma} are finitely generated, then (X,0)(X, 0)\oplus(YΓM,Y)(Y\otimes_\Gamma M, Y) is a support τ\tau-tilting RR-module if and only if both XΛX_{\Lambda} and YΓY_{\Gamma} are support τ\tau-tilting modules, \HomΛ(YΓM,τX)=0\Hom_\Lambda(Y\otimes_\Gamma M,\tau X)=0 and \HomΛ(eΛ,YΓM)=0\Hom_\Lambda(e\Lambda, Y\otimes_\Gamma M)=0 with ee the maximal idempotent such that \HomΛ(eΛ,X)=0\Hom_\Lambda(e\Lambda, X)=0.

Keywords

Cite

@article{arxiv.2004.14186,
  title  = {Silting Modules over Triangular Matrix Rings},
  author = {Hanpeng Gao and Zhaoyong Huang},
  journal= {arXiv preprint arXiv:2004.14186},
  year   = {2020}
}

Comments

17 pages, accepted for publication in Taiwanese Journal of Mathematics

R2 v1 2026-06-23T15:11:01.044Z