On solvability of the first Hochschild cohomology of a finite-dimensional algebra

Abstract

For an arbitrary finite-dimensional algebra A, we introduce a general approach to determining when its first Hochschild cohomology HH1(A), considered as a Lie algebra, is solvable. If A is moreover of tame or finite representation type, we are able to describe HH1(A) as the direct sum of a solvable Lie algebra and a sum of copies of sl2. We proceed to determine the exact number of such copies, and give an explicit formula for this number in terms of certain chains of Kronecker subquivers of the quiver of A. As a corollary, we obtain a precise answer to a question posed by Chaparro, Schroll and Solotar.