The quantum Witten-Kontsevich series and one-part double Hurwitz numbers

Abstract

We study the quantum Witten-Kontsevich series introduced by Buryak, Dubrovin, Gu\'er\'e and Rossi in buryak2016integrable as the logarithm of a quantum tau function for the quantum KdV hierarchy. This series depends on a genus parameter ε and a quantum parameter . When =0, this series restricts to the Witten-Kontsevich generating series for intersection numbers of psi classes on moduli spaces of stable curves. We establish a link between the ε=0 part of the quantum Witten-Kontsevich series and one-part double Hurwitz numbers. These numbers count the number non-equivalent holomorphic maps from a Riemann surface of genus g to P1 with a prescribe ramification profile over 0, a complete ramification over ∞ and a given number of simple ramifications elsewhere. Goulden, Jackson and Vakil proved in goulden2005towards that these numbers have the property to be polynomial in the orders of ramification over 0. We prove that the coefficients of these polynomials are the coefficients of the quantum Witten-Kontsevich series. We also present some partial results about the full quantum Witten-Kontsevich power series.