Reductions for branching coefficients

Abstract

Let G be a connected reductive subgroup of a complex connected reductive group G. We are interested in the branching problem. Fix maximal tori and Borel subgroups of G and G. Consider the cone lr(G, G) generated by the pairs (, nu) of dominant characters such that V* is a submodule of V nu. It is known that lr(G, G) is a closed convex polyhedral cone. In this work, we show that every regular face of lr(G, G) gives rise to a reduction rule for multiplicities. More precisely, we prove that for (, nu) on such a face, the multiplicity of V* in V nu equal to a similar multiplicity for representations of Levi subgroups of G and G. This generalizes, by different methods, results obtained by Brion, Derksen-Weyman, Roth...