Integrability, Random Matrices and Painlev\'e Transcendents

Integrability, Random Matrices and Painlev\'e Transcendents

The probability that an interval $I$ is free of eigenvalues in a matrix ensemble with unitary symmetry is given by a Fredholm determinant. When the weight function in the matrix ensemble is a classical weight function, and the interval $I$ includes an endpoint of the support, Tracy and Widom have gi...

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Hauptverfasser: Witte, N. S, Forrester, P. J, Cosgrove, Christopher M
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Classical Analysis and ODEs
Mathematics - Mathematical Physics
Physics - Mathematical Physics
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Zusammenfassung:The probability that an interval $I$ is free of eigenvalues in a matrix ensemble with unitary symmetry is given by a Fredholm determinant. When the weight function in the matrix ensemble is a classical weight function, and the interval $I$ includes an endpoint of the support, Tracy and Widom have given a formalism which gives coupled differential equations for the required probability and some auxilary quantities. We summarize and extend earlier work by expressing the probability and some of the auxilary quantities in terms of Painlev\'e transcendents.
DOI:10.48550/arxiv.math-ph/0008033