For a Markov chain, both the detailed balance condition and the cycle Kolmogorov condition are algebraic binomials. This remark suggests to study reversible Markov chains with the tool of Algebraic Statistics, such as toric statistical models. One of the results of this study is an algebraic parameterization of reversible Markov transitions and their invariant probability
This paper surveys and relates the basic concepts of process algebra and the modelling of continuous...
The operation of squaring (coproduct followed by product) in a combinatorial Hopf algebra is shown t...
This paper surveys and relates the basic concepts of process algebra and the modelling of continuous...
For a Markov chain, both the detailed balance condition and the cycle Kolmogorov condition are algeb...
Abstract For a Markov chain, both the detailed balance condition and the cycle Kolmogorov condition ...
The theory of time-reversibility has been widely used to derive the expressions of the invariant mea...
This paper provides transition probability estimates of transient reversible Markov chains. The key ...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
The computation of the steady-state distribution of Continuous Time Markov Chains (CTMCs) may be a c...
The present paper deals with reversibility of autoregressive processes of first order, namely AR(1)....
Time reversibility plays an important role in the analysis of continuous and discrete time Markov ch...
AbstractThe present paper deals with reversibility of autoregressive processes of first order, namel...
In this study extending classical Markov chain theory to handle fluctuating transition matrices, the...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
Reversible computations have been widely studied from the functional point of view and energy consum...
This paper surveys and relates the basic concepts of process algebra and the modelling of continuous...
The operation of squaring (coproduct followed by product) in a combinatorial Hopf algebra is shown t...
This paper surveys and relates the basic concepts of process algebra and the modelling of continuous...
For a Markov chain, both the detailed balance condition and the cycle Kolmogorov condition are algeb...
Abstract For a Markov chain, both the detailed balance condition and the cycle Kolmogorov condition ...
The theory of time-reversibility has been widely used to derive the expressions of the invariant mea...
This paper provides transition probability estimates of transient reversible Markov chains. The key ...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
The computation of the steady-state distribution of Continuous Time Markov Chains (CTMCs) may be a c...
The present paper deals with reversibility of autoregressive processes of first order, namely AR(1)....
Time reversibility plays an important role in the analysis of continuous and discrete time Markov ch...
AbstractThe present paper deals with reversibility of autoregressive processes of first order, namel...
In this study extending classical Markov chain theory to handle fluctuating transition matrices, the...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
Reversible computations have been widely studied from the functional point of view and energy consum...
This paper surveys and relates the basic concepts of process algebra and the modelling of continuous...
The operation of squaring (coproduct followed by product) in a combinatorial Hopf algebra is shown t...
This paper surveys and relates the basic concepts of process algebra and the modelling of continuous...