Automorphism Groups of Finite-Dimensional Algebras Acting on Subalgebra Varieties

Abstract

Let k be an algebraically-closed field, and B a unital, associative k-algebra with n := kB < ∞. For each 1 m n, the collection of all m-dimensional subalgebras of B carries the structure of a projective variety, which we call AlgGrm(B). The group Autk(B) of all k-algebra automorphisms of B acts regularly on AlgGrm(B). In this paper, we study the problem of explicitly describing AlgGrm(B), and classifying its Autk(B)-orbits. Inspired by recent results on maximal subalgebras of finite-dimensional algebras, we compute the homogeneous vanishing ideal of AlgGrn-1(B) when B is basic, and explictly describe its irreducible components. We show that in this case, AlgGrn-1(B) is a finite union of Autk(B)-orbits if B is monomial or its Ext quiver is Schur, but construct a class of examples to show that these conditions are not necessary.