Representation dimensions of triangular matrix algebras

Abstract

Let A be a finite dimensional hereditary algebra over an algebraically closed field k, T2(A)=(arrayccA&0 A&Aarray) be the triangular matrix algebra and A(1)=(arrayccA&0 DA&Aarray) be the duplicated algebra of A respectively. We prove that rep.dim\ T2(A) is at most three if A is Dynkin type and rep.dim\ T2(A) is at most four if A is not Dynkin type. Let T be a tilting A- and T=TP be a tilting A(1)-. We show that A(1) T is representation finite if and only if the full subcategory \(X,Y,f)\ |\ X∈ mod\ A, Y∈τ-1F(TA) add\ A\ of mod \ T2(A) is of finite type, where τ is the Auslander-Reiten translation and F(TA) is the torsion-free class of mod\ A associated with T. Moreover, we also prove that rep.dim\ EndA(1)\ T is at most three if A is Dynkin type.