| Preface | p. vii |
| Notations | p. xi |
| Standard abbreviations | p. xiv |
| Introduction to stochastic analysis | p. 1 |
| Tools from probability and analysis | p. 3 |
| Essentials of measure and probability | p. 3 |
| Characteristic functions | p. 13 |
| Conditioning | p. 16 |
| Infinitely divisible and stable distributions | p. 21 |
| Stable laws as the Holtzmark distributions | p. 27 |
| Unimodality of probability laws | p. 29 |
| Compactness for function spaces and measures | p. 35 |
| Fractional derivatives and pseudo-differential operators | p. 42 |
| Propagators and semigroups | p. 48 |
| Brownian motion (BM) | p. 58 |
| Random processes: basic notions | p. 58 |
| Definition and basic properties of BM | p. 62 |
| Construction via broken-line approximation | p. 66 |
| Construction via Hilbert-space methods | p. 69 |
| Construction via Kolmogorov's continuity | p. 71 |
| Construction via random walks and tightness | p. 73 |
| Simplest applications of martingales | p. 76 |
| Skorohod embedding and the invariance principle | p. 78 |
| More advanced Hilbert space methods: Wiener chaos and stochastic integral | p. 81 |
| Fock spaces, Hermite polynomials and Malliavin calculus | p. 87 |
| Stationarity: OU processes and Holtzmark fields | p. 91 |
| Markov processes and martingales | p. 94 |
| Definition of Lévy processes | p. 94 |
| Poisson processes and integrals | p. 96 |
| Construction of Lévy processes | p. 103 |
| Subordinators | p. 108 |
| Markov processes, semigroups and propagators | p. 110 |
| Feller processes and conditionally positive operators | p. 115 |
| Diffusions and jump-type Markov processes | p. 125 |
| Markov processes on quotient spaces and reflections | p. 130 |
| Martingales | p. 132 |
| Stopping times and optional sampling | p. 138 |
| Strong Markov property; diffusions as Feller processes with continuous paths | p. 143 |
| Reflection principle and passage times | p. 147 |
| SDE, ¿DE and martingale problems | p. 152 |
| Markov semigroups and evolution equations | p. 152 |
| The Dirichlet problem for diffusion operators | p. 158 |
| The stationary Feynman-Kac formula | p. 162 |
| Diffusions with variable drift, Ornstein-Uhlenbeck processes | p. 165 |
| Stochastic integrals and SDE based on Lévy processes | p. 167 |
| Markov property and regularity of solutions | p. 172 |
| Stochastic integrals and quadratic variation for square-integrable martingales | p. 178 |
| Convergence of processes and semigroups | p. 187 |
| Weak convergence of martingales | p. 193 |
| Martingale problems and Markov processes | p. 195 |
| Stopping and localization | p. 199 |
| Markov processes and beyond | p. 203 |
| Processes in Euclidean spaces | p. 204 |
| Direct analysis of regularity and well-posedness | p. 205 |
| Introduction to sensitivity analysis | p. 213 |
| The Lie-Trotter type limits and T-products | p. 213 |
| Martingale problems for Lévy type generators: existence | p. 221 |
| Martingale problems for Lévy type generators: moments | p. 226 |
| Martingale problems for Lévy type generators: unbounded coefficients | p. 228 |
| Decomposable generators | p. 231 |
| Sdes driven by nonlinear Lévy noise | p. 240 |
| Stochastic monotonicity and duality | p. 250 |
| Stochastic scattering | p. 255 |
| Nonlinear Markov chains, interacting particles and deterministic processes | p. 257 |
| Comments | p. 262 |
| Processes in domains with a boundary | p. 270 |
| Stopped processes and boundary points | p. 270 |
| Dirichlet problem and mixed initial-boundary problem | p. 274 |
| The method of Lyapunov functions | p. 280 |
| Local criteria for boundary points | p. 282 |
| Decomposable generators in R+d | p. 286 |
| Gluing boundary | p. 290 |
| Processes on the half-line | p. 292 |
| Generators of reflected processes | p. 293 |
| Application to interacting particles: stochastic LLN | p. 295 |
| Application to evolutionary games | p. 304 |
| Application to finances: barrier options, credit derivatives, etc. | p. 307 |
| Comments | p. 308 |
| Heat kernels for stable-like processes | p. 310 |
| One-dimensional stable laws: asymptotic expansions | p. 310 |
| Stable laws: asymptotic expansions and identities | p. 314 |
| Stable laws: bounds | p. 319 |
| Stable laws: auxiliary convolution estimates | p. 323 |
| Stable-like processes: heat kernel estimates | p. 328 |
| Stable-like processes: Feller property | p. 335 |
| Application to sample-path properties | p. 336 |
| Application to stochastic control | p. 340 |
| Application to Langevin equations driven by a stable noise | p. 345 |
| Comments | p. 348 |
| CTRW and fractional dynamics | p. 351 |
| Convergence of Markov semigroups and processes | p. 351 |
| Diffusive approximations for random walks and CLT | p. 354 |
| Stable-like limits for position-dependent random walks | p. 355 |
| Subordination by hitting times and generalized fractional evolutions | p. 361 |
| Limit theorems for position dependent CTRW | p. 369 |
| Comments | p. 371 |
| Complex Markov chains and Feynman integral | p. 373 |
| Infinitely-divisible complex distributions and complex Markov chains | p. 373 |
| Path integral and perturbation theory | p. 380 |
| Extensions | p. 385 |
| Regularization of the Schrödinger equation by complex time or mass, or continuous observation | p. 390 |
| Singular and growing potentials, magnetic fields and curvilinear state spaces | p. 393 |
| Fock-space representation | p. 398 |
| Comments | p. 400 |
| Bibliography | p. 403 |
| Index | p. 425 |
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