Dual pairs in complex classical groups and Lie algebras

Abstract

In Roger Howe's 1989 paper, ``Remarks on classical invariant theory," Howe introduces the notion of a dual pair of Lie subalgebras: a pair (g1, g2) of reductive Lie subalgebras of a Lie algebra g such that g1 and g2 are each other's centralizers in g. This notion has a natural analog for algebraic groups: a dual pair of subgroups is a pair (G1, G2) of reductive subgroups of an algebraic group G such that G1 and G2 are each other's centralizers in G. In this paper, we classify the dual pairs in the complex classical groups (GL(n,C), SL(n,C), Sp(2n,C), O(n,C), and SO(n,C)) and in the corresponding Lie algebras (gl(n,C), sl(n,C), sp(2n,C), and so(n,C)). We also present substantial progress towards classifying the dual pairs in the projective counterparts of the complex classical groups (PGL(n,C), PSp(2n,C), PO(n,C), and PSO(n,C)).