Special Functions for Hyperoctahedral Groups Using Bosonic, Trigonometric Six-Vertex Models
Combinatorics
2023-09-20 v2
Abstract
Recent works have sought to realize certain families of orthogonal, symmetric polynomials as partition functions of well-chosen classes of solvable lattice models. Many of these use Boltzmann weights arising from the trigonometric six-vertex model -matrix (or generalizations or specializations of these weights). In this paper, we seek new variants of bosonic models on lattices designed for type B/C root systems, whose partition functions match the zonal spherical function in type C. Under general assumptions, we find that this is possible for all highest weights in rank and , but not for higher rank.
Keywords
Cite
@article{arxiv.2210.13174,
title = {Special Functions for Hyperoctahedral Groups Using Bosonic, Trigonometric Six-Vertex Models},
author = {Ben Brubaker and Will Grodzicki and Andrew Schultz},
journal= {arXiv preprint arXiv:2210.13174},
year = {2023}
}
Comments
v2 includes significant changes to both the exposition and theoretical content of the paper; 29 pages