Consider an n-state Markov chain in which each transition probability is positive and the transition...

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Consider an n-state Markov chain in which each transition probability is positive and the transition matrix is symmetric
the entry in row I and column J of the transition matrix is identical to the entry in row J and column I. a Why do we know that steady-state probabilities exist for this situation? b What are the steady-state probabilities? Aug 29 2014 11:56 AM

 

Solution ID:609094 | This paper was updated on 26-Nov-2015

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