Understanding Markov Chains [electronic resource] :Examples and Applications / by Nicolas Privault.
by Privault, Nicolas [author.]; SpringerLink (Online service).
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BookSeries: Springer Undergraduate Mathematics Series: Publisher: Singapore : Springer Singapore : 2013.Description: IX, 354 p. 71 illus. online resource.ISBN: 9789814451512.Subject(s): Mathematics | Distribution (Probability theory) | Mathematical statistics | Mathematics | Probability Theory and Stochastic Processes | Statistical Theory and Methods | Statistics for Engineering, Physics, Computer Science, Chemistry and Earth SciencesDDC classification: 519.2 Online resources: Click here to access online | Item type | Current location | Call number | Status | Date due | Barcode |
|---|---|---|---|---|---|
| QA274-274.9 (Browse shelf) | Available | ||||
| Long Loan | MAIN LIBRARY | QA273.A1-274.9 (Browse shelf) | Available |
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| TA775-787 Advances in Hydroinformatics | TC1-1800 Advances in Hydroinformatics | QA273.A1-274.9 Understanding Markov Chains | QA274-274.9 Understanding Markov Chains | TA1637-1638 Interactive Segmentation Techniques | TJ807-830 Decision Making Algorithms for Hydro-Power Plant Location | R856-857 Segmentation of Hand Bone for Bone Age Assessment |
Introduction -- 1) Probability Background -- 2) Gambling Problems -- 3) Random Walks -- 4) Discrete-Time Markov Chains -- 5) First Step Analysis -- 6) Classication of States -- 7) Long-Run Behavior of Markov Chains -- 8) Branching Processes -- 9) Continuous-Time Markov Chains -- 10) Discrete-Time Martingales -- 11) Spatial Poisson Processes -- 12) Reliability Theory -- Some Useful Identities -- Solutions to the Exercises -- References -- Index.
This book provides an undergraduate introduction to discrete and continuous-time Markov chains and their applications. A large focus is placed on the first step analysis technique and its applications to average hitting times and ruin probabilities. Classical topics such as recurrence and transience, stationary and limiting distributions, as well as branching processes, are also covered. Two major examples (gambling processes and random walks) are treated in detail from the beginning, before the general theory itself is presented in the subsequent chapters. An introduction to discrete-time martingales and their relation to ruin probabilities and mean exit times is also provided, and the book includes a chapter on spatial Poisson processes with some recent results on moment identities and deviation inequalities for Poisson stochastic integrals. The concepts presented are illustrated by examples and by 72 exercises and their complete solutions.
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