Global branching laws by global Okounkov bodies

Abstract

Let G' be a complex semisimple group, and let G ⊂eq G' be a semisimple subgroup. We show that the branching cone of the pair (G, G'), which (asymptotically) parametrizes all pairs (W, V) of irreducible finite-dimensional G-representations W which occur as subrepresentations of a finite-dimensional irreducible G'-representation V, can be identified with the pseudo-effective cone, Eff(Y), of some GIT quotient Y of the flag variety of the group G × G'. Moreover, we prove that the quotient Y is a Mori dream space. As a consequence, the global Okounkov body (Y) of Y, with respect to some admissible flag of subvarieties of Y, is fibred over the branching cone of (G, G'), and the fibre (Y)(W, V) over a point (W, V) carries information about (the asymptotics of) the multiplicity of W in V. Using the global Okounkov body (Y), we easily derive a multi-dimensional generalization of Okounkov's result about the log-concavity of asymptotic multiplicities.