Add to ORKGGiven a continuous time Markov Chain {q (x, y )} on a finite set S , the associated noisy voter model is the continuous time Markov chain on {0, 1}^S which evolves by (1) for each two sites x and y in S , the state at site x changes to the value of the state at site y at rate q (x, y ) and (2) each site rerandomizes its state at rate 1. We show that if there is a uniform bound on the rates {q (x, y )} and the corresponding stationary distributions are "almost" uniform, then the mixing time has a sharp cutoff at time log |S |/2 with a window of order 1. Lubetzky and Sly proved cutoff with a window of order 1 for the stochastic Ising model on toroids: we obtain the special case of their result for the cycle as a consequence of our resu...
A sequence of Markov chains is said to exhibit (total variation) cutoff if the conver-gence to stati...
Coarsening on a one-dimensional lattice is described by the voter model or equivalently by coalescin...
By viewing the N-simplex as the set of positions of N - 1 ordered particles on the unit interval, th...
Abstract. Given a continuous time Markov Chain {q(x, y)} on a finite set S, the associated noisy vot...
Given a continuous time Markov Chain {q (x, y)} on a finite set S, the associated noisy voter model ...
Let $(X_t)_{t = 0 }^{\infty}$ be an irreducible reversible discrete-time Markov chain on a finite st...
A card player may ask the following question: how many shuffles are needed to mix up a deck of cards...
Consider a sequence of continuous-time irreducible reversible Markov chains and a sequence of initia...
The aim of this thesis is to present several (co-authored) works of the author concerning applicatio...
This paper proves the existence of a stationary distribution for a class of Markov voting models. We...
In this paper we present, in the context of Diaconis’ paradigm, a general method to detect the cutof...
Consider a low temperature stochastic Ising model in the phase coexistence regime with Markov semig...
We study convergence to equilibrium for a class of Markov chains in random environment. The chains a...
Abstract. We prove that Broder’s Markov chain for approximate sampling near-perfect and perfect matc...
This paper proves the existence of a stationary distribution for a class of Markov voting models. We...
A sequence of Markov chains is said to exhibit (total variation) cutoff if the conver-gence to stati...
Coarsening on a one-dimensional lattice is described by the voter model or equivalently by coalescin...
By viewing the N-simplex as the set of positions of N - 1 ordered particles on the unit interval, th...
Abstract. Given a continuous time Markov Chain {q(x, y)} on a finite set S, the associated noisy vot...
Given a continuous time Markov Chain {q (x, y)} on a finite set S, the associated noisy voter model ...
Let $(X_t)_{t = 0 }^{\infty}$ be an irreducible reversible discrete-time Markov chain on a finite st...
A card player may ask the following question: how many shuffles are needed to mix up a deck of cards...
Consider a sequence of continuous-time irreducible reversible Markov chains and a sequence of initia...
The aim of this thesis is to present several (co-authored) works of the author concerning applicatio...
This paper proves the existence of a stationary distribution for a class of Markov voting models. We...
In this paper we present, in the context of Diaconis’ paradigm, a general method to detect the cutof...
Consider a low temperature stochastic Ising model in the phase coexistence regime with Markov semig...
We study convergence to equilibrium for a class of Markov chains in random environment. The chains a...
Abstract. We prove that Broder’s Markov chain for approximate sampling near-perfect and perfect matc...
This paper proves the existence of a stationary distribution for a class of Markov voting models. We...
A sequence of Markov chains is said to exhibit (total variation) cutoff if the conver-gence to stati...
Coarsening on a one-dimensional lattice is described by the voter model or equivalently by coalescin...
By viewing the N-simplex as the set of positions of N - 1 ordered particles on the unit interval, th...