Craig A. Tracy, Harold Widom
Published 1999-04-09, updated 1999-07-01Version 3
We consider the distributions of the lengths of the longest weakly increasing and strongly decreasing subsequences in words of length N from an alphabet of k letters. We find Toeplitz determinant representations for the exponential generating functions (on N) of these distribution functions and show that they are expressible in terms of solutions of Painlev\'e V equations. We show further that in the weakly increasing case the generating function gives the distribution of the smallest eigenvalue in the k x k Laguerre random matrix ensemble and that the distribution itself has, after centering and normalizing, an N -> infinity limit which is equal to the distribution function for the largest eigenvalue in the Gaussian Unitary Ensemble of k x k hermitian matrices of trace zero.
Comments: 30 pages, revised version corrects an error in the statement of Theorem 4
Journal: Probab. Theory Relat. Fields 119 (2001), 350-380
Expected lengths and distribution functions for Young diagrams in the hook
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The smallest eigenvalues of Hamming graphs, Johnson graphs and other distance-regular graphs with classical parameters
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