Probability Theory
An Analytic View
2nd Edition
- Author: Daniel W. Stroock, Massachusetts Institute of Technology
- Date Published: March 2011
- availability: Temporarily unavailable - available from TBC
- format: Paperback
- isbn: 9780521132503
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This second edition of Daniel W. Stroock's text is suitable for first-year graduate students with a good grasp of introductory, undergraduate probability theory and a sound grounding in analysis. It is intended to provide readers with an introduction to probability theory and the analytic ideas and tools on which the modern theory relies. It includes more than 750 exercises. Much of the content has undergone significant revision. In particular, the treatment of Levy processes has been rewritten, and a detailed account of Gaussian measures on a Banach space is given.
Read more- Presents a novel selection and treatment of probability theory
- The reader will see how probability theory can be used in other branches of mathematics
Reviews & endorsements
'… uniformly well written and well spiced with comments to aid the intuition, so the readership should include a wide range, both of students and of professional probabilists. … We can expect it to take its place alongside the classics of probability theory.' Mathematical Reviews
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×Product details
- Edition: 2nd Edition
- Date Published: March 2011
- format: Paperback
- isbn: 9780521132503
- length: 548 pages
- dimensions: 254 x 179 x 27 mm
- weight: 0.91kg
- contains: 768 exercises
- availability: Temporarily unavailable - available from TBC
Table of Contents
1. Sums of independent random variables
2. The central limit theorem
3. Infinitely divisible laws
4. Levy processes
5. Conditioning and martingales
6. Some extensions and applications of martingale theory
7. Continuous parameter martingales
8. Gaussian measures on a Banach space
9. Convergence of measures on a Polish space
10. Wiener measure and partial differential equations
11. Some classical potential theory.Instructors have used or reviewed this title for the following courses
- MATH FOR TEACHERS
- Topics in Mathematical Probability
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