On Solvability of Automorphism Groups of Commutative Algebras
Abstract
Let A be a finite-dimensional commutative associative algebra with unity over an algebraically closed field K. The purpose of the paper is to study the solvability of GA, where GA is the identity component of AutK(A). Inspired by Pollack's work, Saor\'in and Asensio have started this study for a commutative associative algebra A when dim(R/R2)=2, where R is the Jacobson radical of A. In this paper, we give new sufficient conditions on A so that GA is solvable without any restriction on dim(R/R2).
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