A bimodule approach to dominant dimension

Abstract

We show that a finite dimensional algebra A has dominant dimension at least n ≥ 2 if and only if the regular bimodule A is n-torsionfree if and only if A n(Tr(n-2(V))) as A-bimodules, where V=HomA(D(A),A) is the canonical A-bimodule in the sense of FKY. We apply this to give new formulas for the Hochschild homology and cohomology for algebras with dominant dimension at least two and show a new relation between the first Tachikawa conjecture, the Nakayama conjecture and Gorenstein homological algebra.