Projection of Elliptic Orbits and Branching Laws

Abstract

Let G be a Lie group, and H⊂ G a closed subgroup. Let π be an irreducible unitary representation of G. In this paper, we briefly discuss the orbit method and its application to the branching problem π|H. We use the Gan-Gross-Prasad branching law for (G, H)= ( U(p,q), U(p, q-1) ) as an example to illustrate the relation between u(p, q-1) u(p,q) O(λ) and the branching law of the discrete series Dλ|U(p,q-1) for λ an regular elliptic element. We also discuss some results regarding branching laws and wave front sets. The presentation of this paper does not follow the historical timeline of development.