$\mathfrak{b}$-Hurwitz numbers from refined topological recursion
Combinatorics
2026-03-17 v2 Mathematical Physics
Algebraic Geometry
math.MP
Representation Theory
Abstract
We prove that single -weighted -Hurwitz numbers with internal faces are computed by refined topological recursion on a rational spectral curve, for certain rational weights . Consequently, the -Hurwitz generating function analytically continues to a rational curve. In particular, our results cover the cases of -monotone Hurwitz numbers, and the enumeration of maps and bipartite maps (with internal faces) on non-oriented surfaces. As an application, we prove that the correlators of the Gaussian, Jacobi and Laguerre -ensembles are computed by refined topological recursion.
Keywords
Cite
@article{arxiv.2412.17502,
title = {$\mathfrak{b}$-Hurwitz numbers from refined topological recursion},
author = {Nitin Kumar Chidambaram and Maciej Dołęga and Kento Osuga},
journal= {arXiv preprint arXiv:2412.17502},
year = {2026}
}
Comments
v2: 41 pages, 2 figures, bibliography updated