Topics in the Constructive Theory of Countable Markov Chains
Topics in the Constructive Theory of Countable Markov Chains
V. A. Malyshev, Institut National de Recherche en Informatique et en Automatique (INRIA), Rocquencourt
M. V. Menshikov, Moscow State University
$51.99
USDMarkov chains are an important idea, related to random walks, which crops up widely in applied stochastic analysis. They are used for example in performance modeling and evaluation of computer networks, queuing networks, and telecommunication systems. The main point of the present book is to provide methods, based on the construction of Lyapunov functions, of determining when a Markov chain is ergodic, null recurrent, or transient. These methods, which are on the whole original and new, can also be extended to the study of questions of stability. Of particular concern are reflected random walks and reflected Brownian motion. Here, the authors provide a self-contained introduction to the theory and details of how the required Lyapunov functions are constructed in various situations.
- Original research, first time of publication
- Lots of interest in subject matter
- Of interest to researchers in applied mathematics, statistics, probability
Reviews & endorsements
"...collects together, for the first time, a number of important results and techniques for countable Markov chains....The writing is clear and concise....an important and valuable addition." Kyle Siegrist, Mathematical Reviews
Product details
June 2008Paperback
9780521064477
180 pages
229 × 152 × 11 mm
0.27kg
17 b/w illus.
Available
Table of Contents
- Introduction and history
- 1. Preliminaries
- 2. General criteria
- 3. Explicit construction of Lyapunov functions
- 4. Ideology of induced chains
- 5. Random walks in two dimensional complexes
- 6. Stability
- 7. Exponential convergence and analyticity for ergodic Markov chains
- Bibliography.
