Frobenius bimodules and flat-dominant dimensions

Abstract

We establish relations between Frobenius parts and between flat-dominant dimensions of algebras linked by Frobenius bimodules. This is motivated by the Nakayama conjecture and an approach of Martinez-Villa to the Auslander-Reiten conjecture on stable equivalences. We show that the Frobenius parts of Frobenius extensions are again Frobenius extensions. Further, let A and B be finite-dimensional algebras over a field k, and let (AX) stand for the dominant dimension of an A-module X. If BMA is a Frobenius bimodule, then (A) (BM) and (B) (AB(M, B)). In particular, if B⊂eq A is a left-split (or right-split) Frobenius extension, then (A)=(B). These results are applied to calculate flat-dominant dimensions of a number of algebras: shew group algebras, stably equivalent algebras, trivial extensions and Markov extensions. Finally, we prove that the universal (quantised) enveloping algebras of semisimple Lie algebras are QF-3 rings in the sense of Morita.