Add to ORKGWe consider a Markov process on a connected graph, with edges labeled with transition rates between the adjacent vertices. The distribution of the Markov process converges to the uniform distribution at a rate determined by the second smallest eigenvalue lambda_2 of the Laplacian of the weighted graph. In this paper we consider the problem of assigning transition rates to the edges so as to maximize lambda_2 subject to a linear constraint on the rates. This is the problem of finding the fastest mixing Markov process (FMMP) on the graph. We show that the FMMP problem is a convex optimization problem, which can in turn be expressed as a semidefinite program, and therefore effectively solved numerically. We formulate a dual of the FMMP problem...
We give the first polynomial upper bound on the mixing time of the edge-flip Markov chain for unbias...
We consider a flip dynamics for directed (1+d)-dimensional lattice paths with length L. The model ca...
We show how to bound the mixing time and log-Sobolev constants of Markov chains by bounding the edge...
Abstract. We consider a symmetric random walk on a connected graph, where each edge is la-beled with...
We consider the problem of assigning transition probabilities to the edges of a path in such a way t...
We show how to exploit symmetries of a graph to efficiently compute the fastest mixing Markov chain ...
A variety of paradigms have been proposed to speed up Markov chain mixing, ranging from non-backtrac...
Algorithms are introduced that produce optimal Markovian couplings for large finite-state-space disc...
The aim of this thesis is to present several (co-authored) works of the author concerning applicatio...
Abstract—We focus on a particular non-convex networked optimization problem, known as the Maximum Va...
AbstractMixing time quantifies the convergence speed of a Markov chain to the stationary distributio...
The edge flipping is a non-reversible Markov chain on a given connected graph, which is defined by C...
International audienceConsider a finite irreducible Markov chain with invariant probability π. Defin...
Bobkov, Houdr\'e, and the last author [2000] introduced a Poincar\'e-type functional parameter, $\la...
We investigate the mixing rate of a Markov chain where a combination of long distance edges and non-...
We give the first polynomial upper bound on the mixing time of the edge-flip Markov chain for unbias...
We consider a flip dynamics for directed (1+d)-dimensional lattice paths with length L. The model ca...
We show how to bound the mixing time and log-Sobolev constants of Markov chains by bounding the edge...
Abstract. We consider a symmetric random walk on a connected graph, where each edge is la-beled with...
We consider the problem of assigning transition probabilities to the edges of a path in such a way t...
We show how to exploit symmetries of a graph to efficiently compute the fastest mixing Markov chain ...
A variety of paradigms have been proposed to speed up Markov chain mixing, ranging from non-backtrac...
Algorithms are introduced that produce optimal Markovian couplings for large finite-state-space disc...
The aim of this thesis is to present several (co-authored) works of the author concerning applicatio...
Abstract—We focus on a particular non-convex networked optimization problem, known as the Maximum Va...
AbstractMixing time quantifies the convergence speed of a Markov chain to the stationary distributio...
The edge flipping is a non-reversible Markov chain on a given connected graph, which is defined by C...
International audienceConsider a finite irreducible Markov chain with invariant probability π. Defin...
Bobkov, Houdr\'e, and the last author [2000] introduced a Poincar\'e-type functional parameter, $\la...
We investigate the mixing rate of a Markov chain where a combination of long distance edges and non-...
We give the first polynomial upper bound on the mixing time of the edge-flip Markov chain for unbias...
We consider a flip dynamics for directed (1+d)-dimensional lattice paths with length L. The model ca...
We show how to bound the mixing time and log-Sobolev constants of Markov chains by bounding the edge...