Eigencones and the PRV conjecture

Abstract

Let G be a complex semisimple simply connected algebraic group. Given two irreducible representations V1 and V2 of G, we are interested in some components of V1 V2. Consider two geometric realizations of V1 and V2 using the Borel-Weil-Bott theorem. Namely, for i=1, 2, let i be a G-linearized line bundle on G/B such that Hqi(G/B,i) is isomorphic to Vi. Assume that the cup product Hq1(G/B,1) Hq2(G/B,2) Hq1+q2(G/B,12) is non zero. Then, Hq1+q2(G/B,12) is an irreducible component of V1 V2; such a component is said to be cohomological. Solving a Dimitrov-Roth conjecture, we prove here that the cohomological components of V1 V2 are exactly the PRV components of stable multiplicity one. Note that Dimitrov-Roth already obtained some particular cases. We also characterize these components in terms of the geometry of the Eigencone of G. Along the way, we prove that the structure coefficients of the Belkale-Kumar product on H*(G/B,) in the Schubert basis are zero or one.