| Preface | p. V |
| References | p. IX |
| Random Matrices, Random Processes and Integrable Models | |
| Random and Integrable Models in Mathematics and Physics | p. 3 |
| Permutations, Words, Generalized Permutations and Percolation | p. 4 |
| Longest Increasing Subsequences in Permutations, Words and Generalized Permutations | p. 4 |
| Young Diagrams and Schur Polynomials | p. 6 |
| Robinson-Schensted-Knuth Correspondence for Generalized Permutations | p. 9 |
| The Cauchy Identity | p. 11 |
| Uniform Probability on Permutations, Plancherel Measure and Random Walks | p. 13 |
| Probability Measure on Words | p. 22 |
| Generalized Permutations, Percolation and Growth Models | p. 24 |
| Probability on Partitions, Toeplitz and Fredholm Determinants | p. 33 |
| Probability on Partitions Expressed as Toeplitz Determinants | p. 35 |
| The Calculus of Infinite Wedge Spaces | p. 39 |
| Probability on Partitions Expressed as Fredholm Determinants | p. 44 |
| Probability on Partitions Expressed as U(n) Integrals | p. 48 |
| Examples | p. 50 |
| Plancherel Measure and Gessel's Theorem | p. 50 |
| Probability on Random Words | p. 54 |
| Percolation | p. 56 |
| Limit Theorems | p. 60 |
| Limit for Plancherel Measure | p. 60 |
| Limit Theorem for Longest Increasing Sequences | p. 64 |
| Limit Theorem for the Geometrically Distributed Percolation Model, when One Side of the Matrix Tends to $$$ | p. 67 |
| Limit Theorem for the Geometrically Distributed Percolation Model, when Both Sides of the Matrix Tend to $$$ | p. 71 |
| Limit Theorem for the Exponentially Distributed Percolation Model, when Both Sides of the Matrix tend to $$$ | p. 75 |
| Orthogonal Polynomials for a Time-Dependent Weight and the KP Equation | p. 76 |
| Orthogonal Polynomials | p. 76 |
| Time-Dependent Orthogonal Polynomials and the KP Equation | p. 81 |
| Virasoro Constraints | p. 88 |
| Virasoro Constraints for ?-Integrals | p. 88 |
| Examples | p. 93 |
| Random Matrices | p. 96 |
| Haar Measure on the Space Hn of Hermitian Matrices | p. 96 |
| Random Hermitian Ensemble | p. 99 |
| Reproducing Kernels | p. 102 |
| Correlations and Fredholm Determinants | p. 104 |
| The Distribution of Hermitian Matrix Ensembles | p. 108 |
| Classical Hermitian Matrix Ensembles | p. 108 |
| The Probability for the Classical Hermitian Random Ensembles and PDEs Generalizing Painlevé | p. 113 |
| Chazy and Painlevé Equations | p. 119 |
| Large Hermitian Matrix Ensembles | p. 120 |
| Equilibrium Measure for GUE and Wigner's Semi-Circle | p. 120 |
| Soft Edge Scaling Limit for GUE and the Tracy-Widom Distribution | p. 122 |
| References | p. 128 |
| Integrable Systems, Random Matrices, and Random Processes | p. 131 |
| Matrix Integrals and Solitons | p. 134 |
| Random Matrix Ensembles | p. 134 |
| Large n-limits | p. 137 |
| KP Hierarchy | p. 139 |
| Vertex Operators, Soliton Formulas and Fredholm Determinants | p. 141 |
| Virasoro Relations Satisfied by the Fredholm Determinant | p. 144 |
| Differential Equations for the Probability in Scaling Limits | p. 146 |
| Recursion Relations for Unitary Integrals | p. 151 |
| Results Concerning Unitary Integrals | p. 151 |
| Examples from Combinatorics | p. 154 |
| Bi-orthogonal Polynomials on the Circle and the Toeplitz Lattice | p. 157 |
| Virasoro Constraints and Difference Relations | p. 159 |
| Singularity Confinement of Recursion Relations | p. 163 |
| Coupled Random Matrices and the 2-Toda Lattice | p. 167 |
| Main Results for Coupled Random Matrices | p. 167 |
| Link with the 2-Toda Hierarchy | p. 168 |
| L-U Decomposition of the Moment Matrix, Bi-orthogonal Polynomials and 2-Toda Wave Operators | p. 171 |
| Bilinear Identities and $$$-function PDEs | p. 174 |
| Virasoro Constraints for the $$$- functions | p. 176 |
| Consequences of the Virasoro Relations | p. 179 |
| Final Equations | p. 181 |
| Dyson Brownian Motion and the Airy Process | p. 182 |
| Processes | p. 182 |
| PDEs and Asymptotics for the Processes | p. 189 |
| Proof of the Results | p. 192 |
| The Pearcey Distribution | p. 199 |
| GUE with an External Source and Brownian Motion | p. 199 |
| MOPS and a Riemann-Hilbert Problem | p. 202 |
| Results Concerning Universal Behavior | p. 204 |
| 3-KP Deformation of the Random Matrix Problem | p. 208 |
| Virasoro Constraints for the Integrable Deformations | p. 213 |
| A PDE for the Gaussian Ensemble with External Source and the Pearcey PDE | p. 218 |
| A Hirota Symbol Residue Identity | p. 221 |
| References | p. 223 |
| Random Matrices and Applications | |
| Integral Operators in Random Matrix Theory | p. 229 |
| Hilbert-Schmidt and Trace Class Operators. Trace and Determinant. Fredholm Determinants of Integral Operators | p. 229 |
| Correlation Functions and Kernels of Integral Operators. Spacing Distributions as Operator Determinants. The Sine and Airy Kernels | p. 238 |
| Differential Equations for Distribution Functions Arising in Random Matrix Theory. Representations in Terms of Painlevé functions | p. 243 |
| References | p. 249 |
| Lectures on Random Matrix Models | p. 251 |
| Random Matrix Models and Orthogonal Polynomials | p. 252 |
| Unitary Ensembles of Random Matrices | p. 252 |
| The Riemann-Hilbert Problem for Orthogonal Polynomials | p. 260 |
| Distribution of Eigenvalues and Equilibrium Measure | p. 263 |
| Large N Asymptotics of Orthogonal Polynomials. The Riemann-Hilbert Approach | p. 267 |
| Heine's Formula for Orthogonal Polynomials | p. 267 |
| First Transformation of the RH Problem | p. 269 |
| Second Transformation of the RHP: Opening of Lenses | p. 271 |
| Model RHP | p. 272 |
| Construction of a Parametrix at Edge Points | p. 280 |
| Third and Final Transformation of the RHP | p. 286 |
| Solution of the RHP for Rn(z) | p. 287 |
| Asymptotics of the Recurrent Coefficients | p. 288 |
| Universality in the Random Matrix Model | p. 291 |
| Double Scaling Limit in a Random Matrix Model | p. 294 |
| Ansatz of the Double Scaling Limit | p. 294 |
| Construction of the Parametrix in ?WKB | p. 297 |
| Construction of the Parametrix near the Turning Points | p. 299 |
| Construction of the Parametrix near the Critical Point | p. 300 |
| Large N Asymptotics of the Partition Function of Random Matrix Models | p. 308 |
| Partition Function | p. 308 |
| Analyticity of the Free Energy for Regular V | p. 310 |
| Topological Expansion | p. 311 |
| One-Sided Analyticity at a Critical Point | p. 313 |
| Double Scaling Limit of the Free Energy | p. 315 |
| Random Matrix Model with External Source | p. 315 |
| Random Matrix Model with External Source and Multiple Orthogonal Polynomials | p. 315 |
| Gaussian Matrix Model with External Source and Non-Intersecting Brownian Bridges | p. 321 |
| Gaussian Model with External Source. Main Results | p. 322 |
| Construction of a Parametrix in the Case a > 1 | p. 326 |
| Construction of a Parametrix in the Case a < 1 | p. 333 |
| Double Scaling Limit at a = 1 | p. 340 |
| Concluding Remarks | p. 346 |
| References | p. 347 |
| Large N Asymptotics in Random Matrices | p. 351 |
| The RH Representation of the Orthogonal Polynomials and Matrix Models | p. 351 |
| Introduction | p. 351 |
| The RH Representation of the Orthogonal Polynomials | p. 355 |
| Elements of the RH Theory | p. 360 |
| The Asymptotic Analysis of the RH Problem. The DKMVZ Method | p. 373 |
| A Naive Approach | p. 373 |
| The g-Function | p. 373 |
| Construction of the g-Function | p. 378 |
| The Parametrix at the End Points. The Conclusion of the Asymptotic Analysis | p. 383 |
| The Model Problem Near z = z0 | p. 383 |
| Solution of the Model Problem | p. 386 |
| The Final Formula for the Parametrix | p. 390 |
| The Conclusion of the Asymptotic Analysis | p. 391 |
| The Critical Case. The Double Scaling Limit and the Second Painlevé Equation | p. 394 |
| The Parametrix at z = 0 | p. 394 |
| The Conclusion of the Asymptotic Analysis in the Critical Case | p. 399 |
| Analysis of the RH Problem (1C)-(3C). The Second Painlevé Equation | p. 403 |
| The Painlevé Asymptotics of the Recurrence Coefficients | p. 406 |
| References | p. 412 |
| Formal Matrix Integrals and Combinatorics of Maps | p. 415 |
| Introduction | p. 415 |
| Formal Matrix Integrals | p. 417 |
| Combinatorics of Maps | p. 419 |
| Topological Expansion | p. 423 |
| Loop Equations | p. 423 |
| Examples | p. 429 |
| 1-Matrix Model | p. 429 |
| 2-Matrix Model | p. 431 |
| Chain of Matrices | p. 434 |
| Closed Chain of Matrices | p. 435 |
| O(n) Model | p. 435 |
| Potts Model | p. 437 |
| 3-Color Model | p. 438 |
| 6-Vertex Model | p. 438 |
| ADE Models | p. 438 |
| ABAB Models | p. 439 |
| Discussion | p. 439 |
| Summary of Some Known Results | p. 439 |
| Some Open Problems | p. 440 |
| References | p. 441 |
| Application of Random Matrix Theory to Multivariate Statistics | p. 443 |
| Multivariate Statistics | p. 443 |
| Wishart Distribution | p. 443 |
| An Example with $$$ cIp | p. 446 |
| Edge Distribution Functions | p. 448 |
| Summary of Fredholm Determinant Representations | p. 448 |
| Universality Theorems | p. 449 |
| Painlevé Representations: A Summary | p. 451 |
| Preliminaries | p. 454 |
| Determinant Matters | p. 454 |
| Recursion Formula for the Eigenvalue Distributions | p. 455 |
| The Distribution of the mth Largest Eigenvalue in the GUE | p. 458 |
| The Distribution Function as a Fredholm Determinant | p. 458 |
| Edge Scaling and Differential Equations | p. 459 |
| The Distribution of the mth Largest Eigenvalue in the GSE | p. 463 |
| The Distribution Function as a Fredholm Determinant | p. 463 |
| Gaussian Specialization | p. 468 |
| Edge Scaling | p. 474 |
| The Distribution of the mth Largest Eigenvalue in the GOE | p. 481 |
| The Distribution Function as a Fredholm Determinant | p. 481 |
| Gaussian Specialization | p. 486 |
| Edge Scaling | p. 490 |
| An Interlacing Property | p. 499 |
| Numerics | p. 503 |
| Partial Derivatives of q(x, ?) | p. 503 |
| Algorithms | p. 503 |
| Tables | p. 504 |
| References | p. 505 |
| Index | p. 509 |
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