Crystal constructions in Number Theory

A Berenstein; A Berenstein; A Braverman; Angèle M. Hamel; Arkady Berenstein; B Brubaker; B Brubaker; B Brubaker; Ben Brubaker; Ben Brubaker; D Bump; Daniel Bump; G Chinta; G Chinta; G Chinta; G Lusztig; G Lusztig; G Lusztig; Gautam Chinta; H Davenport; H Matsumoto; Holley Friedlander; J Beineke; J Kamnitzer; J Neukirch; Jennifer Beineke; K Yamamoto; M Kashiwara; M Patnaik; N Bourbaki; P Littelmann; P Littelmann; Peter J. McNamara; PJ McNamara; S Friedberg; Takeshi TOKUYAMA; W Casselman

research

Crystal constructions in Number Theory

Abstract

Weyl group multiple Dirichlet series and metaplectic Whittaker functions can be described in terms of crystal graphs. We present crystals as parameterized by Littelmann patterns and we give a survey of purely combinatorial constructions of prime power coefficients of Weyl group multiple Dirichlet series and metaplectic Whittaker functions using the language of crystal graphs. We explore how the branching structure of crystals manifests in these constructions, and how it allows access to some intricate objects in number theory and related open questions using tools of algebraic combinatorics

Similar works

Full text

Available Versions

Enlighten

oai:eprints.gla.ac.uk:305458

Last time updated on 05/09/2023

Crossref

Last time updated on 10/08/2021