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paper

Topological expansion of the Bethe ansatz, and quantum algebraic geometry

arXiv:0911.1664

Abstract

In this article, we solve the loop equations of the β-random matrix model, in a way similar to what was found for the case of hermitian matrices β=1. For β=1, the solution was expressed in terms of algebraic geometry properties of an algebraic spectral curve of equation y^2=U(x). For arbitrary β, the spectral curve is no longer algebraic, it is a Schroedinger equation ((\hbar\partial)^2-U(x)).ψ(x)=0 where \hbar\propto (\sqrtβ-1/\sqrtβ). In this article, we find a solution of loop equations, which takes the same form as the topological recursion found for β=1. This allows to define natural generalizations of all algebraic geometry properties, like the notions of genus, cycles, forms of 1st, 2nd and 3rd kind, Riemann bilinear identities, and spectral invariants F_g, for a quantum spectral curve, i.e. a D-module of the form y^2-U(x), where [y,x]=\hbar. Also, our method allows to enumerate non-oriented discrete surfaces.

latex, 70 pages, 10 figures. Misprints corrected, references added