Maximal tori in $HH^1$ and the fundamental group

Abstract: We investigate maximal tori in the Hochschild cohomology Lie algebra HH 1 (A) of a finite dimensional algebra A, and their connection with the fundamental groups associated to presentations of A. We prove that every maximal torus in HH 1 (A) arises as the dual of some fundamental group of A, extending work of Farkas, Green and Marcos; de la Peña and Saorín; and Le Meur. Combining this with known invariance results for Hochschild cohomology, we deduce that (in rough terms) the largest rank of a fundamental grou… Show more