English

Representation dimensions of triangular matrix algebras

Representation Theory 2013-01-24 v1

Abstract

Let AA be a finite dimensional hereditary algebra over an algebraically closed field kk, T2(A)=(A0AA)T_2(A)=(\begin{array}{cc}A&0 A&A\end{array}) be the triangular matrix algebra and A(1)=(A0DAA)A^{(1)}=(\begin{array}{cc}A&0 DA&A\end{array}) be the duplicated algebra of AA respectively. We prove that rep.dim T2(A){\rm rep.dim}\ T_2(A) is at most three if AA is Dynkin type and rep.dim T2(A){\rm rep.dim}\ T_2(A) is at most four if AA is not Dynkin type. Let TT be a tilting A-\module\module and \olT=T\olP\ol{T}=T\oplus\ol{P} be a tilting A(1)A^{(1)}-\module\module. We show that \EndA(1)\olT\End_{A^{(1)}} \ol{T} is representation finite if and only if the full subcategory {(X,Y,f)  Xmod A,Yτ1F(TA)add A}\{(X,Y,f)\ |\ X\in {\rm mod}\ A, Y\in\tau^{-1}\mathscr{F}(T_A)\cup{\rm add}\ A\} of mod T2(A){\rm mod \ T_2(A)} is of finite type, where τ\tau is the Auslander-Reiten translation and F(TA)\mathscr{F}(T_A) is the torsion-free class of mod A{\rm mod}\ A associated with TT. Moreover, we also prove that rep.dim EndA(1) \olT{\rm rep.dim\ End}_{A^{(1)}}\ {\ol T} is at most three if AA is Dynkin type.

Keywords

Cite

@article{arxiv.1107.3865,
  title  = {Representation dimensions of triangular matrix algebras},
  author = {Hongbo Yin and Shunhua Zhang},
  journal= {arXiv preprint arXiv:1107.3865},
  year   = {2013}
}

Comments

19 pages

R2 v1 2026-06-21T18:39:10.604Z