We develop a generic method for bounding the convergence rate of an averaging algorithm running in a multi-agent system with a time-varying network, where the associated stochastic matrices have a time-independent Perron vector. This method provides bounds on convergence rates that unify and refine most of the previously known bounds. They depend on geometric parameters of the dynamic communication graph such as the normalized diameter or the bottleneck measure. As corollaries of these geometric bounds, we show that the convergence rate of the Metropolis algorithm in a system of n agents is less than 1 − 1/4n 2 with any communication graph that may vary in time, but is permanently connected and bidirectional. We prove a similar upper bound ...
Motivated by applications of distributed linear estimation, distributed control, and distributed opt...
In this thesis, we study Distributed Averaging Dynamics and its main application, i.e. Distributed O...
Abstract—We find the exact rate for convergence in probability of products of independent, identical...
We develop a generic method for bounding the convergence rate of an averaging algorithm running in a...
International audienceWe develop a generic method for bounding the convergence rate of an averaging ...
We consider distributed iterative algorithms for the averaging problem over time-varying topologies....
We consider distributed iterative algorithms for the averaging problem over timevarying topologies. ...
We consider a multi-agent setting with agents exchanging information over a network to solve a conve...
We apply recent results in Markov chain theory to Hastings and Metropolis algorithms with either ind...
We study the convergence speed of distributed iterative algorithms for the consensus and averaging p...
We consider the problem of cooperatively minimizing the sum of convex functions, where the functions...
International audienceWe analyse average-based distributed algorithms relying on simple and pairwise...
We study a process of averaging in a distributed system with noisy communication. Each of the agents...
We study the problem of asymptotic consensus as it occurs in a wide range of applications in both ma...
This paper gives a lower bound on the convergence rate of a class of network consensus algorithms. T...
Motivated by applications of distributed linear estimation, distributed control, and distributed opt...
In this thesis, we study Distributed Averaging Dynamics and its main application, i.e. Distributed O...
Abstract—We find the exact rate for convergence in probability of products of independent, identical...
We develop a generic method for bounding the convergence rate of an averaging algorithm running in a...
International audienceWe develop a generic method for bounding the convergence rate of an averaging ...
We consider distributed iterative algorithms for the averaging problem over time-varying topologies....
We consider distributed iterative algorithms for the averaging problem over timevarying topologies. ...
We consider a multi-agent setting with agents exchanging information over a network to solve a conve...
We apply recent results in Markov chain theory to Hastings and Metropolis algorithms with either ind...
We study the convergence speed of distributed iterative algorithms for the consensus and averaging p...
We consider the problem of cooperatively minimizing the sum of convex functions, where the functions...
International audienceWe analyse average-based distributed algorithms relying on simple and pairwise...
We study a process of averaging in a distributed system with noisy communication. Each of the agents...
We study the problem of asymptotic consensus as it occurs in a wide range of applications in both ma...
This paper gives a lower bound on the convergence rate of a class of network consensus algorithms. T...
Motivated by applications of distributed linear estimation, distributed control, and distributed opt...
In this thesis, we study Distributed Averaging Dynamics and its main application, i.e. Distributed O...
Abstract—We find the exact rate for convergence in probability of products of independent, identical...