Abstract: We study a large class of reversible Markov chains with discrete state space and transition matrixPN. We define the notion of a set of metastable points as a subset of the state space N such that (i) this set is reached from any point x ∈ N without return to x with probability at least bN, while (ii) for any two points x, y in the metastable set, the probability T −1x,y to reach y from x without return to x is smaller than a−1N bN. Under some additional non-degeneracy assumption, we show that in such a situation: (i) To each metastable point corresponds a metastable state, whose mean exit time can be computed precisely. (ii) To each metastable point corresponds one simple eigenvalue of 1 − PN which is essentially equal to the inv...
This article considers a class of metastable non-reversible diffusion processes whose invariant meas...
We develop a potential theoretic approach to the problem of metastability for reversible diffusion p...
We consider Metropolis Markov chains with finite state space and transition probabilities of the for...
We study a large class of reversible Markov chains with discrete state space and transition matrix $...
We study a large class of reversible Markov chains with discrete state space and transition matrix $...
Consider finite state space irreducible and absorbing Markov processes. A general spectral criterion...
In this Letter we announce rigorous results that elucidate the relation between metastable states an...
We assume that the transition matrix of a Markov chain depends on a parameter ε, and converges as ε→...
The problem of not degenerate in energy metastable states forming a series in the framework of rever...
Abstract. We present a formalism to describe slowly decaying systems in the context of finite Markov...
Abstract — In this paper, we discuss the dynamics of metastable systems. Such systems exhibit intere...
We consider Metropolis Markov chains with finite state space and transition probabilities of the for...
We propose a new definition of metastability of Markov processes on countable state spaces. We obtai...
In this thesis we look at dynamical systems in which typical trajectories (1) have a non-zero probab...
A family of irreducible Markov chains on a finite state space is considered as an exponential pertur...
This article considers a class of metastable non-reversible diffusion processes whose invariant meas...
We develop a potential theoretic approach to the problem of metastability for reversible diffusion p...
We consider Metropolis Markov chains with finite state space and transition probabilities of the for...
We study a large class of reversible Markov chains with discrete state space and transition matrix $...
We study a large class of reversible Markov chains with discrete state space and transition matrix $...
Consider finite state space irreducible and absorbing Markov processes. A general spectral criterion...
In this Letter we announce rigorous results that elucidate the relation between metastable states an...
We assume that the transition matrix of a Markov chain depends on a parameter ε, and converges as ε→...
The problem of not degenerate in energy metastable states forming a series in the framework of rever...
Abstract. We present a formalism to describe slowly decaying systems in the context of finite Markov...
Abstract — In this paper, we discuss the dynamics of metastable systems. Such systems exhibit intere...
We consider Metropolis Markov chains with finite state space and transition probabilities of the for...
We propose a new definition of metastability of Markov processes on countable state spaces. We obtai...
In this thesis we look at dynamical systems in which typical trajectories (1) have a non-zero probab...
A family of irreducible Markov chains on a finite state space is considered as an exponential pertur...
This article considers a class of metastable non-reversible diffusion processes whose invariant meas...
We develop a potential theoretic approach to the problem of metastability for reversible diffusion p...
We consider Metropolis Markov chains with finite state space and transition probabilities of the for...