Exceptional representations of a double quiver of type A, and Richardson elements in seaweed Lie algebras

Abstract

In this paper, we study the set of -filtered modules of quasi-hereditary algebras arising from quotients of the double of quivers of type A. Our main result is that for any fixed -dimension vector, there is a unique (up to isomorphism) exceptional -filtered module. We then apply this result to show that there is always an open adjoint orbit in the nilpotent radical of a seaweed Lie algebra in gln(), thus answering positively in this gln() case to a question raised independently by Michel Duflo and Dmitri Panyushev. An example of a seaweed Lie algebra in a simple Lie algebra of type E8 not admitting an open orbit in its nilpotent radical is given.