Finitistic dimension conjecture and extensions of algebras

Abstract

An extension of algebras is a homomorphism of algebras preserving identities. We use extensions of algebras to study the finitistic dimension conjecture over Artin algebras. Let f: B A be an extension of Artin algebras. We denote by fin.dim(f) the relative finitistic dimension of f, which is defined to be the supremum of relative projective dimensions of finitely generated left A-modules of finite projective dimension. We prove that, if B is representation-finite and fin.dim(f)≤ 1, then A has finite finitistic dimension. For the case of fin.dim(f)> 1, we give a sufficient condition for A with finite finitistic dimension. Also, we prove the following result: Let I, J, K be three ideals of an Artin algebra A such that IJK=0 and K⊃eq rad(A). If both A/I and A/J are A-syzygy-finite, then the finitistic dimension of A is finite.