English

Support $\tau$-Tilting Modules under Split-by-Nilpotent Extensions

Representation Theory 2020-04-30 v1 Rings and Algebras

Abstract

Let Γ\Gamma be a split extension of a finite-dimensional algebra Λ\Lambda by a nilpotent bimodule ΛEΛ_\Lambda E_\Lambda, and let (T,P)(T,P) be a pair in modΛ\mod\Lambda with PP projective. We prove that (TΛΓΓ,PΛΓΓ)(T\otimes_\Lambda \Gamma_\Gamma, P\otimes_\Lambda \Gamma_\Gamma) is a support τ\tau-tilting pair in modΓ\mod \Gamma if and only if (T,P)(T,P) is a support τ\tau-tilting pair in modΛ\mod \Lambda and \HomΛ(TΛE,τTΛ)=0=\HomΛ(P,TΛE)\Hom_\Lambda(T\otimes_\Lambda E,\tau T_\Lambda)=0=\Hom_\Lambda(P,T\otimes_\Lambda E). As applications, we obtain a necessary and sufficient condition such that (TΛΓΓ,PΛΓΓ)(T\otimes_\Lambda \Gamma_\Gamma, P\otimes_\Lambda \Gamma_\Gamma) is support τ\tau-tilting pair for a cluster-tilted algebra Γ\Gamma corresponding to a tilted algebra Λ\Lambda; and we also get that if T1,T2modΛT_1,T_2\in\mod\Lambda such that T1ΛΓT_1\otimes_\Lambda \Gamma and T2ΛΓT_2\otimes_\Lambda \Gamma are support τ\tau-tilting Γ\Gamma-modules, then T1ΛΓT_1\otimes_\Lambda \Gamma is a left mutation of T2ΛΓT_2\otimes_\Lambda \Gamma if and only if T1T_1 is a left mutation of T2T_2.

Cite

@article{arxiv.2004.14141,
  title  = {Support $\tau$-Tilting Modules under Split-by-Nilpotent Extensions},
  author = {Hanpeng Gao and Zhaoyong Huang},
  journal= {arXiv preprint arXiv:2004.14141},
  year   = {2020}
}
R2 v1 2026-06-23T15:10:53.547Z