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Stochastic Processes
Courant Lecture Notes in Mathematics
Executive Editor Jalal Shatah
Managing Editor Paul D. Monsour
Assistant Editor Reeva Goldsmith
S. R. S. Varadhan Courant Institute of Mathematical Sciences
16 Stochasti c Processes
Courant Institute of Mathematical Science s New York University New York, New York
American Mathematical Societ y Providence, Rhode Island
http://dx.doi.org/10.1090/cln/016
2000 Mathematics Subject Classification. P r i m a r y 60G05 , 60G07 .
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Varadhan, S . R . S . Stochastic processe s / S . R . S . Varadhan .
p. cm . — (Couran t lectur e note s ; 16 ) Includes bibliographica l reference s an d index . ISBN 978-0-8218-4085- 6 (alk . paper ) 1. Stochasti c processes . I . Title .
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Dedication
To Gopal
I had planned to complete this book within a short time of the publication of the volume on probability theory . Bu t the events of September 11 , 2001, intervened. We lost our son Gopal that day, a victim of violence in the name of God. I dedicate this volume to his memory.
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Contents
Preface
Chapter 1 . Introductio n 1.1. Continuou s Time Processes 1.2. Continuou s Parameter Martingales 1.3. Semimartingale s 1.4. Martingale s and Stochastic Integrals
Chapter 2. Processe s with Independent Increments 2.1. Th e Basic Poisson Process 2.2. Compoun d Poisson Processes 2.3. Infinit e Number of Small Jumps 2.4. Infinitesima l Generator s 2.5. Som e Associated Martingales
Chapter 3. Poisso n Point Processes 3.1. Poin t Processes 3.2. Poisso n Point Process
Chapter 4. Jum p Markov Processes 4.1. Simpl e Examples 4.2. Semigroup s of Operators 4.3. Example : Birth and Death Processes 4.4. Marko v Processes and Martingales 4.5. Explosio n 4.6. Recurrenc e and Transience 4.7. Invarian t Distributions 4.8. Beyon d Explosion
Chapter 5. Brownia n Motion 5.1. Definitio n o f Brownian Motion 5.2. Marko v and Strong Markov Property 5.3. Hea t Equation 5.4. Recurrenc e 5.5. Feynman-Ka c Formula 5.6. Arcsin e Law 5.7. Harmoni c Oscillato r 5.8. Exi t Times from Bounded Intervals
ix
1 1 3 8
10
13 13 16 17 20 21
25 25 26
29 29 31 34 35 39 44 45 47
49 49 51 53 55 56 57 59 60
vii
viii CONTENT S
5.9. Stochasti c Integrals 5.10. Brownia n Motion with a Drift, Girsano v Fo 5.11. Ornstein-Uhlenbec k Proces s 5.12. Invarian t Densities 5.13. Loca l Times 5.14. Reflecte d Brownian Motion 5.15. Excursio n Theory 5.16. Invarianc e Principle 5.17. Representatio n of Martingales
Chapter 6. One-Dimensiona l Diffusion s 6.1. Stochasti c Differential Equation s 6.2. Propertie s of the Solution 6.3. Connection s with Differential Equation s 6.4. Martingal e Characterizatio n 6.5. Rando m Time Change 6.6. Som e Examples
Chapter 7. Genera l Theory of Markov Processes 7.1. Introductio n 7.2. Semigroups , Generators and Resolvents 7.3. Generator s and Martingales 7.4. Invarian t Measures and Ergodic Theory
Appendix A. Measure s on Polish Spaces A.l. Th e Space C[0, 1] A.2. Th e Space D[0, 1]
Appendix B. Additiona l Remarks
Bibliography
Index
Preface
This i s a continuation o f the volume o n probability theor y an d likewise cov-ers the contents of courses given at the Courant Institute. Thi s volume deals with certain elementary continuous-tim e processes . W e start with a description o f the Poisson process and related processes with independent increments . Afte r a brief look at Markov processes with a finite number of jumps we proceed to study Brow-nian motion. W e then go on to develop stochastic integrals and Ito's theory in the context of one-dimensional diffusion processes . I t ends with a brief surve y of the general theory of Markov processes.
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Bibliography
[1] Chung , K. L. Markov chains with stationary transition probabilities. 2nd ed. Die Grundlehren der mathematischen Wissenschaften, 104 . Springer, New York, 1967.
[2] Durrett , R . Stochastic calculus. A practical introduction. Probability an d Stochastic s Series . CRC Press, Boca Raton, Fla., 1996.
[3] Dynkin , E. B. Markov processes and semi-groups of operators. Teor. Veroyatnost. i Primenen. 1 (1956) , 25-37.
[4] Dynkin , E. B. One-dimensional continuous strong Markov processes. Theor. Probability Appl. 4 (1959), 1-52 .
[5] Parthasarathy , K. R. Probability measures on metric spaces. Reprint of the 1967 original. AMS Chelsea, Providence, R.I., 2005.
[6] Stroock , D. W.; Varadhan, S . R. S. Multidimensional diffusion processes. Reprin t of the 199 7 edition. Classics in Mathematics. Springer, Berlin, 2006.
[7] Varadhan , S . R. S . Probability theory. Couran t Lectur e Note s i n Mathematics , 7 . New Yor k University, Couran t Institut e o f Mathematica l Sciences , Ne w York ; America n Mathematica l Society, Providence, R.I., 2001.
[8] Wiener , N. Differential space . J. Math. Phys. 2 (1923), 132-174.
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Index
C[a, b], 3 D[a, b], 3
arcsine law, 57
Bessel process, 104 birth and death process, 34 Brownian motion, 49
geometric, 100 Markov property, 51 strong Markov property, 51
Chapman-Kolmogorov equations , 29 continuous-parameter martingale, 3
differential equation s and Markov processes, 94
Doob decomposition, 8 Doob's h-transform, 10 5 Doob's inequality, 4 Doob-Meyer decomposition, 8 Dynkin's formula, 11 0
excursion theory, 81 exit distribution, 36 exit time, 36
distribution, 60 explosion, 39, 71, 102
Feller's test, 102 Feynman-Kac formula, 56 filtration, 3
generator, 31 Girsanov formula, 69
harmonic oscillator, 59 heat equation, 53
infinitesimal generator , 20, 31 invariant distribution, 45, 75, 111
Ito's formula, 66 for stochastic integrals, 91
jump Markov process, 29 and strong Markov property, 32
Levy-Khintchine representation, 1 8 life after death, 47 local time, 76
martingale, 3, 22 exponential martingale, 23, 68 martingale problem, 97
one-dimensional diffusions, 8 7 option pricing, 101 optional stopping, 5, 6 Ornstein-Uhlenbeck process, 72 outer measure, 2
point process, 25 marked, 27 Poisson, 26
Poisson process, 13 compound, 1 6 rate, 15
Poisson random measure, 26 processes with independent increments, 17
quadratic variation, 61
random time change, 99 recurrence, 55 reflected Brownian motion, 79 reflection principle, 52 regularity
C[0, 1] , 116 D[0, 1] , 118
semigroup, 20, 31 semimartingale, 8 stable laws, 19
126
stochastic differential equatio n existence of, 8 7 properties of solutions of, 9 0 uniqueness of, 8 7
stochastic integration, 10 , 61 stochastic process, 1 stopped field, 4 stopping time, 4 submartingale, 4 supermartingale, 4
Tulceas' theorem, 30
Wiener's stochastic integral, 62