Title: Random Matrix Models and Their Applications
Abstract: 1. Symmetrized random permutations Jinho Baik and Eric M. Rains 2. Hankel determinants as Fredholm determinants Estelle L. Basor, Yang Chen and Harold Widom 3. Universality and scaling of zeros on symplectic manifolds Pavel Bleher, Bernard Shiffman and Steve Zelditch 4. Z measures on partitions, Robinson-Schensted-Knuth correspondence, and random matrix ensembles Alexei Borodin and Grigori Olshanski 5. Phase transitions and random matrices Giovanni M. Cicuta 6. Matrix model combinatorics: applications to folding and coloring Philippe Di Francesco 7. Inter-relationships between orthogonal, unitary and symplectic matrix ensembles Peter J. Forrester and Eric M. Rains 8. A note on random matrices John Harnad 9. Orthogonal polynomials and random matrix theory Mourad E. H. Ismail 10. Random words, Toeplitz determinants and integrable systems I, Alexander R. Its, Craig A. Tracy and Harold Widom 11. Random permutations and the discrete Bessel kernel Kurt Johansson 12. Solvable matrix models Vladimir Kazakov 13. Tau function for analytic Curves I. K. Kostov, I. Krichever, M. Mineev-Vainstein, P. B. Wiegmann and A. Zabrodin 14. Integration over angular variables for two coupled matrices G. Mahoux, M. L. Mehta and J.-M. Normand 15. SL and Z-measures Andrei Okounkov 16. Integrable lattices: random matrices and random permutations Pierre Van Moerbeke 17. Some matrix integrals related to knots and links Paul Zinn-Justin.
Publication Year: 2001
Publication Date: 2001-01-01
Language: en
Type: book
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Cited By Count: 150
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