An approach to the finitistic dimension conjecture

Abstract

Let R be a finite dimensional k-algebra over an algebraically closed field k and mod R be the category of all finitely generated left R-modules. For a given full subcategory X of mod R, we denote by X the projective finitistic dimension of X. That is, X:=sup \ X : X∈X and X<∞\. \ It was conjectured by H. Bass in the 60's that the projective finitistic dimension (R):= (mod R) has to be finite. Since then, much work has been done toward the proof of this conjecture. Recently, K. Igusa and J. Todorov defined a function :mod R N, which turned out to be useful to prove that (R) is finite for some classes of algebras. In order to have a different approach to the finitistic dimension conjecture, we propose to consider a class of full subcategories of mod R instead of a class of algebras, namely to take the class of categories (θ) of θ-filtered R-modules for all stratifying systems (θ,≤) in mod R.