Random Matrices, Random Processes and Integrable Systems

Introduction by John Harnad Part I Random Matrices, Random Processes and Integrable Models Chapter 1 Random and Integrable Models in Mathematics and Physics by Pierre van Moerbeke Chapter 2 Integrable Systems, Random Matrices, and Random Processes by Mark Adler Part II Random Matrices and Applications Chapter 3 Integral Operators in Random Matrix Theory by Harold Widom Chapter 4 Lectures on Random Matrix Models by Pavel M. Bleher Chapter 5 Large N Asymptotics in Random Matrices by Alexander R. Its Chapter 6 Formal Matrix Integrals and Combinatorics of Maps by B. Eynard Chapter 7 Application of Random Matrix Theory to Multivariate Statistics by Momar Dieng and Craig A. Tracy