Tilting modules for the Cummings construction

Abstract

Finiteness of the right little finitistic dimension of a finite dimensional algebra is known to be equivalent to existence of a (possibly infinite dimensional) tilting right -module Tf whose tilting class is \ Tf \∞ = ( P < ∞), AT. We use this equivalence to interpret the recent surprising results of Cummings C concerning the asymmetry of left and right finitistic dimensions of the triangular matrix algebras A built from arbitrary basic finite dimensional algebras A. In particular, we determine the structure of the tilting right A-module Tf in the case when the algebra A has finite right global dimension.