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16: Markov Processes

Last updated

May 5, 2020
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- 15.6: Renewal Reward Processes
- 16.1: Introduction to Markov Processes

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A Markov process is a random process in which the future is independent of the past, given the present. Thus, Markov processes are the natural stochastic analogs of the deterministic processes described by differential and difference equations. They form one of the most important classes of random processes.

16.1: Introduction to Markov Processes
A Markov process is a random process indexed by time, and with the property that the future is independent of the past, given the present. Markov processes, named for Andrei Markov, are among the most important of all random processes. In a sense, they are the stochastic analogs of differential equations and recurrence relations, which are of course, among the most important deterministic processes.
16.2: Potentials and Generators for General Markov Processes
16.3: Introduction to Discrete-Time Chains
16.4: Transience and Recurrence for Discrete-Time Chains
16.5: Periodicity of Discrete-Time Chains
16.6: Stationary and Limiting Distributions of Discrete-Time Chains
16.7: Time Reversal in Discrete-Time Chains
16.8: The Ehrenfest Chains
16.9: The Bernoulli-Laplace Chain
16.10: Discrete-Time Reliability Chains
16.11: Discrete-Time Branching Chain
16.12: Discrete-Time Queuing Chains
16.13: Discrete-Time Birth-Death Chains
16.14: Random Walks on Graphs
16.15: Introduction to Continuous-Time Markov Chains
16.16: Transition Matrices and Generators of Continuous-Time Chains
16.17: Potential Matrices
16.18: Stationary and Limting Distributions of Continuous-Time Chains
16.19: Time Reversal in Continuous-Time Chains
16.20: Chains Subordinate to the Poisson Process
16.21: Continuous-Time Birth-Death Chains
16.22: Continuous-Time Queuing Chains
16.23: Continuous-Time Branching Chains

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