On Isoclasses of Maximal Subalgebras Determined by Automorphisms

Abstract

Let k be an algebraically-closed field, and let B = kQ/I be a basic, finite-dimensional associative k-algebra with n := kB < ∞. Previous work shows that the collection of maximal subalgebras of B carries the structure of a projective variety, denoted by msa (Q), which only depends on the underlying quiver Q of B. The automorphism group Autk(B) acts regularly on msa (Q). Since msa (Q) does not depend on the admissible ideal I, it is not necessarily easy to tell when two points of msa (Q) actually correspond to isomorphic subalgebras of B. One way to gain insight into this problem is to study Autk(B)-orbits of msa (Q), and attempt to understand how isoclasses of maximal subalgebras decompose as unions of Autk(B)-orbits. This paper investigates the problem for B = kQ, where Q is a type A Dynkin quiver. We show that for such B, two maximal subalgebras with connected Ext quivers are isomorphic if and only if they lie in the same Autk(B)-orbit of msa (Q).