Polynomiality of Hurwitz numbers, Bouchard-Mari\~no conjecture, and a new proof of the ELSV formula
Petr Dunin-Barkowski, Maxim Kazarian, Nicolas Orantin, Sergey Shadrin,, Loek Spitz
TL;DR
This paper provides a new proof of the ELSV formula by establishing polynomiality of Hurwitz numbers without relying on it, and then uses this to prove the Bouchard-Mariño conjecture and their equivalence.
Contribution
It introduces a novel proof of the ELSV formula avoiding its traditional reliance, and connects the Bouchard-Mariño conjecture with the ELSV formula through topological recursion.
Findings
Proved polynomiality of Hurwitz numbers without ELSV
Established the Bouchard-Mariño conjecture using polynomiality
Proved the equivalence of Bouchard-Mariño conjecture and ELSV formula
Abstract
In this paper we give a new proof of the ELSV formula. First, we refine an argument of Okounkov and Pandharipande in order to prove (quasi-)polynomiality of Hurwitz numbers without using the ELSV formula (the only way to do that before used the ELSV formula). Then, using this polynomiality we give a new proof of the Bouchard-Mari\~no conjecture. After that, using the correspondence between the Givental group action and the topological recursion coming from matrix models, we prove the equivalence of the Bouchard-Mari\~no conjecture and the ELSV formula (it is a refinement of an argument by Eynard).
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