Box splines, tensor product multiplicities and the volume function
Abstract
We study the relationship between the tensor product multiplicities of a compact semisimple Lie algebra and a special function associated to , called the volume function. The volume function arises in connection with the randomized Horn's problem in random matrix theory and has a related significance in symplectic geometry. Building on box spline deconvolution formulae of Dahmen-Micchelli and De Concini-Procesi-Vergne, we develop new techniques for computing the multiplicities from , answering a question posed by Coquereaux and Zuber. In particular, we derive an explicit algebraic formula for a large class of Littlewood-Richardson coefficients in terms of . We also give analogous results for weight multiplicities, and we show a number of further identities relating the tensor product multiplicities, the volume function and the box spline. To illustrate these ideas, we give new proofs of some known theorems.
Cite
@article{arxiv.1909.12278,
title = {Box splines, tensor product multiplicities and the volume function},
author = {Colin McSwiggen},
journal= {arXiv preprint arXiv:1909.12278},
year = {2020}
}
Comments
37 pages. v2: Significant improvements to the text. Main results unchanged