Geometric Multiplicities

Abstract

In this paper, we introduce geometric multiplicities, which are positive varieties with potential fibered over the Cartan subgroup H of a reductive group G. They form a monoidal category and we construct a monoidal functor from this category to the representations of the Langlands dual group G of G. Using this, we explicitly compute various multiplicities in G-modules in many ways. In particular, we recover the formulas for tensor product multiplicities of Berenstein- Zelevinsky and generalize them in several directions. In the case when our geometric multiplicity X is a monoid, i.e., the corresponding G module is an algebra, we expect that in many cases, the spectrum of this algebra is affine G-variety X, and thus the correspondence X X has a flavor of both the Langlands duality and mirror symmetry.