Topological recursion for Masur-Veech volumes
Abstract
We study the Masur-Veech volumes of the principal stratum of the moduli space of quadratic differentials of unit area on curves of genus with punctures. We show that the volumes are the constant terms of a family of polynomials in variables governed by the topological recursion/Virasoro constraints. This is equivalent to a formula giving these polynomials as a sum over stable graphs, and retrieves a result of \cite{Delecroix} proved by combinatorial arguments. Our method is different: it relies on the geometric recursion and its application to statistics of hyperbolic lengths of multicurves developed in \cite{GRpaper}. We also obtain an expression of the area Siegel--Veech constants in terms of hyperbolic geometry. The topological recursion allows numerical computations of Masur--Veech volumes, and thus of area Siegel--Veech constants, for low and , which leads us to propose conjectural formulas for low but all . We also relate our polynomials to the asymptotic counting of square-tiled surfaces with large boundaries.
Cite
@article{arxiv.1905.10352,
title = {Topological recursion for Masur-Veech volumes},
author = {Jørgen Ellegaard Andersen and Gaëtan Borot and Séverin Charbonnier and Vincent Delecroix and Alessandro Giacchetto and Danilo Lewanski and Campbell Wheeler},
journal= {arXiv preprint arXiv:1905.10352},
year = {2023}
}
Comments
75 pages, v2: added a section on enumeration of square-tiled surfaces