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Asymptotic expansion of matrix models in the multi-cut regime

Gaëtan Borot, Alice Guionnet

2024Forum of Mathematics Sigma14 citationsDOIOpen Access PDF

Abstract

Abstract We establish the asymptotic expansion in $\beta $ matrix models with a confining, off-critical potential in the regime where the support of the equilibrium measure is a finite union of segments. We first address the case where the filling fractions of these segments are fixed and show the existence of a $\frac {1}{N}$ expansion. We then study the asymptotics of the sum over the filling fractions to obtain the full asymptotic expansion for the initial problem in the multi-cut regime. In particular, we identify the fluctuations of the linear statistics and show that they are approximated in law by the sum of a Gaussian random variable and an independent Gaussian discrete random variable with oscillating center. Fluctuations of filling fractions are also described by an oscillating discrete Gaussian random variable. We apply our results to study the all-order small dispersion asymptotics of solutions of the Toda chain associated with the one Hermitian matrix model ( $\beta = 2$ ) as well as orthogonal ( $\beta = 1$ ) and skew-orthogonal ( $\beta = 4$ ) polynomials outside the bulk.

Topics & Concepts

MathematicsRandom matrixAsymptotic expansionGaussianHermitian matrixMatrix (chemical analysis)Random variableMathematical analysisOrthogonal polynomialsCombinatoricsPure mathematicsPhysicsStatisticsQuantum mechanicsComposite materialMaterials scienceEigenvalues and eigenvectorsRandom Matrices and ApplicationsAdvanced Combinatorial MathematicsAlgebraic structures and combinatorial models
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