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arxiv: 1112.4601 · v1 · pith:MSBBE7IJnew · submitted 2011-12-20 · 🧮 math.AG · math-ph· math.MP

Formal pseudodifferential operators and Witten's r-spin numbers

classification 🧮 math.AG math-phmath.MP
keywords numbersr-spinwittenclosed-formdescriptionsformalformulaintersection
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We derive an effective recursion for Witten's r-spin intersection numbers, using Witten's conjecture relating r-spin numbers to the Gel'fand-Dikii hierarchy (Theorem 4.1). Consequences include closed-form descriptions of the intersection numbers (for example, in terms of gamma functions: Propositions 5.2 and 5.4, Corollary 5.5). We use these closed-form descriptions to prove Harer-Zagier's formula for the Euler characteristic of M_{g,1}. Finally in Section 6, we extend Witten's series expansion formula for the Landau-Ginzburg potential to study r-spin numbers in the small phase space in genus zero. Our key tool is the calculus of formal pseudodifferential operators, and is partially motivated by work of Brezin and Hikami.

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  1. A Matrix Model for Higher-Genus Fuss--Catalan Numbers

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    A two-matrix model is introduced whose 1/N expansion yields higher-genus Fuss-Catalan numbers for arbitrary p, together with sum rules and an explicit formula extending the Harer-Zagier result.