We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This allows estimation and testing. The prior arises from random walk with reinforcement in the same way the Dirichlet prior arises from Pólya’s urn. We give closed form normalizing constants, a simple method of simulation from the posterior and a characterization along the lines of W. E. Johnson’s characterization of the Dirichlet prior
Reversibility is a key concept in Markov models and Master-equation models of molecular kinetics. Th...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
In many applications one is interested in finding a simplified model which captures the essential dy...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
We present a nonparametric prior over reversible Markov chains. We use completely random mea-sures, ...
We present a nonparametric prior over reversible Markov chains. We use completely random mea-sures, ...
This dissertation describes the research that we have done concerning reversible Markov chains...
This dissertation describes the research that we have done concerning reversible Markov chains...
We present a nonparametric prior over reversible Markov chains. We use completely random mea-sures, ...
Reversibility is a key concept in Markov models and Master-equation models of molecular kinetics. Th...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
In many applications one is interested in finding a simplified model which captures the essential dy...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
We present a nonparametric prior over reversible Markov chains. We use completely random mea-sures, ...
We present a nonparametric prior over reversible Markov chains. We use completely random mea-sures, ...
This dissertation describes the research that we have done concerning reversible Markov chains...
This dissertation describes the research that we have done concerning reversible Markov chains...
We present a nonparametric prior over reversible Markov chains. We use completely random mea-sures, ...
Reversibility is a key concept in Markov models and Master-equation models of molecular kinetics. Th...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
In many applications one is interested in finding a simplified model which captures the essential dy...
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