AbstractGómez and Salazar showed that for n⩽3, the spanning tree invariants of the loop systems of a Markov chain determined by an irreducible stochastic n×n matrix P coincide if and only if P is doubly stochastic. It was also conjectured that the result holds for all n. We prove this conjecture
The attached file may be somewhat different from the published versionInternational audienceIn this ...
We are interested in Markov laces defined in the framework of the theory of Markov chains in continu...
AbstractLet S be the set of n×n (sub)permutation matrices, doubly (sub)stochastic matrices, or the s...
AbstractGómez and Salazar showed that for n⩽3, the spanning tree invariants of the loop systems of a...
Gò mez and Salazar showed that for n≤ 3, the spanning tree invariants of the loop systems of a Marko...
AbstractThe spanning tree invariant of Lind and Tuncel [12] is observed in the context of loop syste...
AbstractWe show that the mean recurrence times of (countable state) irreducible and positively recur...
The invariant measure is a fundamental object in the theory of Markov processes. In finite dimension...
AbstractWe extend the Markov Chain Tree Theorem to general commutative semirings, and we generalize ...
We extend the Markov Chain Tree Theorem to general commutative semirings, and we generalize the Stat...
AbstractA classical result of Markov chain theory states that if A is primitive and stochastic then ...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
International audienceGiven a finite Markov chain, we investigate the first minors of the transition...
In Markov chain models in finance and healthcare a transition matrix over a certain time interval is...
This thesis will briefly go over definitions and properties of continuous time Markov chains and des...
The attached file may be somewhat different from the published versionInternational audienceIn this ...
We are interested in Markov laces defined in the framework of the theory of Markov chains in continu...
AbstractLet S be the set of n×n (sub)permutation matrices, doubly (sub)stochastic matrices, or the s...
AbstractGómez and Salazar showed that for n⩽3, the spanning tree invariants of the loop systems of a...
Gò mez and Salazar showed that for n≤ 3, the spanning tree invariants of the loop systems of a Marko...
AbstractThe spanning tree invariant of Lind and Tuncel [12] is observed in the context of loop syste...
AbstractWe show that the mean recurrence times of (countable state) irreducible and positively recur...
The invariant measure is a fundamental object in the theory of Markov processes. In finite dimension...
AbstractWe extend the Markov Chain Tree Theorem to general commutative semirings, and we generalize ...
We extend the Markov Chain Tree Theorem to general commutative semirings, and we generalize the Stat...
AbstractA classical result of Markov chain theory states that if A is primitive and stochastic then ...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
International audienceGiven a finite Markov chain, we investigate the first minors of the transition...
In Markov chain models in finance and healthcare a transition matrix over a certain time interval is...
This thesis will briefly go over definitions and properties of continuous time Markov chains and des...
The attached file may be somewhat different from the published versionInternational audienceIn this ...
We are interested in Markov laces defined in the framework of the theory of Markov chains in continu...
AbstractLet S be the set of n×n (sub)permutation matrices, doubly (sub)stochastic matrices, or the s...
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