On solvability of the automorphism group of a finite-dimensional algebra

Alexander Perepechko

Published 2010-12-01Version 1

Consider an automorphism group of a finite-dimensional algebra. S. Halperin conjectured that the unity component of this group is solvable if the algebra is a complete intersection. The solvability criterion recently obtained by M. Schulze provides a proof to a local case of this conjecture as well as gives an alternative proof of S.S.--T. Yau's theorem based on a powerful result due to G. Kempf. In this note we finish the proof of Halperin's conjecture and study the extremal cases in Schulze's criterion, where the algebra of derivations is non-solvable. This allows us to reduce a direct, self-contained proof of Yau's theorem.