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Probability theory

By: S. R. S. VaradhanMaterial type: Text

TextSeries: Courant Lecture Notes ; Vol. 7Publication details: Rhode Island: American Mathematical Society: [c2001]Description: 167 pISBN: 9781470419141Subject(s): MathematicsLOC classification: QA273

Contents:

Chapter 1. Measure theory Chapter 2. Weak convergence Chapter 3. Independent sums Chapter 4. Dependent random variables Chapter 5. Martingales Chapter 6. Stationary stochastic processes Chapter 7. Dynamic programming and filtering

Summary: In the first part of the book, characteristic functions are introduced, followed by the study of weak convergence of probability distributions. Then both the weak and strong limit theorems for sums of independent random variables are proved, including the weak and strong laws of large numbers, central limit theorems, laws of the iterated logarithm, and the Kolmogorov three series theorem. The first part concludes with infinitely divisible distributions and limit theorems for sums of uniformly infinitesimal independent random variables. The second part of the book mainly deals with dependent random variables, particularly martingales and Markov chains. Topics include standard results regarding discrete parameter martingales and Doob's inequalities. The standard topics in Markov chains are treated, i.e., transience, and null and positive recurrence. A varied collection of examples is given to demonstrate the connection between martingales and Markov chains. --- summary provided by publisher

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Item type	Current library	Collection	Shelving location	Call number	Status	Notes	Date due	Barcode	Item holds
Book	ICTS	Mathematic	Rack No 5	QA273 (Browse shelf (Opens below))	Available	Billno:IN 003 582; Billdate: 2018-01-11		00969

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Chapter 1. Measure theory
Chapter 2. Weak convergence
Chapter 3. Independent sums
Chapter 4. Dependent random variables
Chapter 5. Martingales
Chapter 6. Stationary stochastic processes
Chapter 7. Dynamic programming and filtering

In the first part of the book, characteristic functions are introduced, followed by the study of weak convergence of probability distributions. Then both the weak and strong limit theorems for sums of independent random variables are proved, including the weak and strong laws of large numbers, central limit theorems, laws of the iterated logarithm, and the Kolmogorov three series theorem. The first part concludes with infinitely divisible distributions and limit theorems for sums of uniformly infinitesimal independent random variables.

The second part of the book mainly deals with dependent random variables, particularly martingales and Markov chains. Topics include standard results regarding discrete parameter martingales and Doob's inequalities. The standard topics in Markov chains are treated, i.e., transience, and null and positive recurrence. A varied collection of examples is given to demonstrate the connection between martingales and Markov chains. --- summary provided by publisher

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