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On the Tracy-Widom beta-distribution for beta=6

Research output: Contribution to journalArticle

Original languageEnglish
Article number105
Number of pages26
JournalSymmetry, Integrability and Geometry: Methods and Applications
Volume12
DOIs
DateAccepted/In press - 20 Oct 2016
DatePublished (current) - 1 Nov 2016

Abstract

We study the Tracy-Widom distribution function for Dyson's β - ensemble with β = 6. The starting point of our analysis is the recent work of I. Rumanov where he produces a Lax-pair representation for the Bloemendal-Virag equation. The latter is a linear PDE which describes the Tracy-Widom functions corresponding to general values of β. Using his Lax pair, Rumanov derives an explicit formula for the Tracy-Widom β = 6 function in terms of the second Painlev\'e transcendent and the solution of an auxiliary ODE. Rumanov also shows that this formula allows him to derive formally the asymptotic expansion of the Tracy-Widom function. Our goal is to make Rumanov's approach and hence the asymptotic analysis it provides rigorous. In this paper, the first one in a sequel, we show that Rumanov's Lax-pair can be interpreted as a certain gauge transformation of the standard Lax pair for the second Painlevé equation. This gauge transformation though contains functional parameters which are defined via some auxiliary nonlinear ODE which is equivalent to the auxiliary ODE of Rumanov's formula. The gauge-interpretation of Rumanov's Lax-pair allows us to highlight the steps of the original Rumanov's method which needs rigorous justifications in order to make the method complete. We provide a rigorous justification of one of these steps. Namely, we prove that the Painlevé function involved in Rumanov's formula is indeed, as it has been suggested by Rumanov, the Hastins-McLeod solution of the second Painlevé equation. The key issue which we also discuss and which is still open is the question of integrability of the auxiliary ODE in Rumanov's formula. We note that this question is crucial for the rigorous asymptotic analysis of the Tracy-Widom function. We also notice that our work is a partial answer to one of the problems related to the β -ensembles formulated by Percy Deift during the June 2015 Montreal Conference on integrable systems.

    Research areas

  • β-ensamble, β-Tracy–Widom distribution, Painlevé II equation

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    Rights statement: This is the final published version of the article (version of record). It first appeared online via National Academy of Science of Ukraine at http://dx.doi.org/10.3842/SIGMA.2016.105. Please refer to any applicable terms of use of the publisher.

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