Verfügbarkeit: Large deviations for stochastic processes

Large deviations for stochastic processes:

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Bibliographische Detailangaben
Beteiligte Personen:	Feng, Jin (VerfasserIn), Kurtz, Thomas G. 1941- (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	Providence, Rhode Island American Mathematical Society [2006]
Schriftenreihe:	Mathematical surveys and monographs Volume 131
Schlagwörter:	Grandes desvios Grandes déviations Markov, Processus de Processos estocásticos Processus stochastiques Semi-groupes d'opérateurs Solutions de viscosité Large deviations Semigroups of operators Markov processes Stochastic processes Viscosity solutions Markov-Prozess Große Abweichung
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=015457094&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Umfang:	xi, 410 Seiten
ISBN:	9780821841457 0821841459 9781470418700

Internformat

MARC


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Datensatz im Suchindex

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adam_text	Contents Preface jx Notation xi Introduction 1 Chapter 1. Introduction 3 1.1. Basic methodology 4 1.2. The basic setting for Markov processes 6 1.3. Related approaches 8 1.4. Examples 10 1.5. An outline of the major obstacles 25 Chapter 2. An overview 29 2.1. Basic setup 30 2.2. Compact state spaces 30 2.3. General state spaces 33 Part 1. The general theory of large deviations 39 Chapter 3. Large deviations and exponential tightness 41 3.1. Basic definitions and results 41 3.2. Identifying a rate function 50 3.3. Rate functions in product spaces 53 Chapter 4. Large deviations for stochastic processes 57 4.1. Exponential tightness for processes 57 4.2. Large deviations under changes of time-scale 62 4.3. Compactification 64 4.4. Large deviations in the compact uniform topology 65 4.5. Exponential tightness for solutions of martingale problems 67 4.6. Verifying compact containment 71 4.7. Finite dimensional determination of the process rate function 73 Part 2. Large deviations for Markov processes and semigroup convergence 77 Chapter 5. Large deviations for Markov processes and nonlinear semigroup convergence 79 5.1. Convergence of sequences of operator semigroups 79 5.2. Applications to large deviations 82 vi CONTENTS Chapter 6. Large deviations and nonlinear semigroup convergence using viscosity solutions 97 6.1. Viscosity solutions, definition and convergence 98 6.2. Large deviations using viscosity semigroup convergence 106 Chapter 7. Extensions of viscosity solution methods 109 7.1. Viscosity solutions, definition and convergence 109 7.2. Large deviation applications 126 7.3. Convergence using projected operators 130 Chapter 8. The Nisio semigroup and a control representation of the rate function 135 8.1. Formulation of the control problem 135 8.2. The Nisio semigroup 141 8.3. Control representation of the rate function 142 8.4. Properties of the control semigroup V 143 8.5. Verification of semigroup representation 151 8.6. Verifying the assumptions 155 Part 3. Examples of large deviations and the comparison principle 163 Chapter 9. The comparison principle 165 9.1. General estimates 165 9.2. General conditions in Rd 172 9.3. Bounded smooth domains in Rd with (possibly oblique) reflection 179 9.4. Conditions for infinite dimensional state space 184 Chapter 10. Nearly deterministic processes in Rd 199 10.1. Processes with independent increments 199 10.2. Random walks 207 10.3. Markov processes 207 10.4. Nearly deterministic Markov chains 219 10.5. Diffusion processes with reflecting boundaries 221 Chapter 11. Random evolutions 229 11.1. Discrete time, law of large numbers scaling 230 11.2. Continuous time, law of large numbers scaling 244 11.3. Continuous time, central limit scaling 260 11.4. Discrete time, central limit scaling 266 11.5. Diffusions with periodic coefficients 269 11.6. Systems with small diffusion and averaging 271 Chapter 12. Occupation measures 283 12.1. Occupation measures of a Markov process - Discrete time 284 12.2. Occupation measures of a Markov process - Continuous time 288 Chapter 13. Stochastic equations in infinite dimensions 293 13.1. Stochastic reaction-diffusion equations on a rescaled lattice 293 13.2. Stochastic Cahn-Hilliard equations on rescaled lattice 305 13.3. Weakly interacting stochastic particles 315 CONTENTS vii Appendix 343 Appendix A. Operators and convergence in function spaces 345 A.I. Semicontinuity 345 A. 2. General notions of convergence 346 A.3. Dissipativity of operators 350 Appendix B. Variational constants, rate of growth and spectral theory for the semigroup of positive linear operators 353 B.I. Relationship to the spectral theory of positive operators 354 B.2. Relationship to some variational constants 357 Appendix C. Spectral properties for discrete and continuous Laplacians 367 C.I. The case of d = 1 368 C.2. The case of d > 1 368 C.3. E = L2(O) Π {ρ : J pdx = 0} 369 C. 4. Other useful approximations 370 Appendix D. Results from mass transport theory 371 D.I. Distributional derivatives 371 D.2. Convex functions 375 D.3. The p- Wasserstein metric space 376 D.4. The Monge-Kantorovich problem 378 D.5. Weighted Sobolev spaces #¿(-Rd) and Я 1^) 382 D.6. Fisher information and its properties 386 D.7. Mass transport inequalities 394 D.8. Miscellaneous 401 Bibliography 403
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author	Feng, Jin Kurtz, Thomas G. 1941-
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indexdate	2024-12-20T12:50:59Z
institution	BVB
isbn	9780821841457 0821841459 9781470418700
language	English
lccn	2006045899
oai_aleph_id	oai:aleph.bib-bvb.de:BVB01-015457094
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owner_facet	DE-91G DE-BY-TUM DE-29T DE-703 DE-355 DE-BY-UBR DE-384 DE-83 DE-11
physical	xi, 410 Seiten
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publisher	American Mathematical Society
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series	Mathematical surveys and monographs
series2	Mathematical surveys and monographs
spellingShingle	Feng, Jin Kurtz, Thomas G. 1941- Large deviations for stochastic processes Mathematical surveys and monographs Grandes desvios larpcal Grandes déviations Markov, Processus de Processos estocásticos larpcal Processus stochastiques Semi-groupes d'opérateurs Solutions de viscosité Large deviations Semigroups of operators Markov processes Stochastic processes Viscosity solutions Markov-Prozess (DE-588)4134948-9 gnd Große Abweichung (DE-588)4330658-5 gnd
subject_GND	(DE-588)4134948-9 (DE-588)4330658-5
title	Large deviations for stochastic processes
title_auth	Large deviations for stochastic processes
title_exact_search	Large deviations for stochastic processes
title_full	Large deviations for stochastic processes Jin Feng ; Thomas G. Kurtz
title_fullStr	Large deviations for stochastic processes Jin Feng ; Thomas G. Kurtz
title_full_unstemmed	Large deviations for stochastic processes Jin Feng ; Thomas G. Kurtz
title_short	Large deviations for stochastic processes
title_sort	large deviations for stochastic processes
topic	Grandes desvios larpcal Grandes déviations Markov, Processus de Processos estocásticos larpcal Processus stochastiques Semi-groupes d'opérateurs Solutions de viscosité Large deviations Semigroups of operators Markov processes Stochastic processes Viscosity solutions Markov-Prozess (DE-588)4134948-9 gnd Große Abweichung (DE-588)4330658-5 gnd
topic_facet	Grandes desvios Grandes déviations Markov, Processus de Processos estocásticos Processus stochastiques Semi-groupes d'opérateurs Solutions de viscosité Large deviations Semigroups of operators Markov processes Stochastic processes Viscosity solutions Markov-Prozess Große Abweichung
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=015457094&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV000018014
work_keys_str_mv	AT fengjin largedeviationsforstochasticprocesses AT kurtzthomasg largedeviationsforstochasticprocesses

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