Add to ORKGThis paper gives a lower bound on the convergence rate of a class of network consensus algorithms. Two different approaches using directed graphs as a main tool are introduced: one is to compute the “scrambling constants” of stochastic matrices associated with “neighbor shared graphs” and the other is to analyze random walks on a sequence of graphs. Both approaches prove that the time to reach consensus within a dynamic network is logarithmic in the relative error and is in worst case exponential in the size of the network
The problem of self-coordination of a network of dynamical systems toward a common state is often re...
Abstract — Characterizing convergence speed is one of the important research challenges in the desig...
We analyze a class of distributed quantized consensus algorithms for arbitrary networks. In the init...
This paper gives a lower bound on the convergence rate of a class of network consensus algorithms. T...
We study the convergence speed of distributed iterative algorithms for the consensus and averaging p...
The problem addressed in this paper is the analysis of a distributed consensus algorithm for arbitra...
The quantities of coefficient of ergodicity and algebraic connectivity have been used to estimate th...
We consider a consensus algorithm in which every nodein a sequence of undirected, B-connected graphs...
We consider a consensus algorithm in which every node in a time-varying undirected connected graph a...
In this work we study the performance of asymptotic and approximate consensus algorithms in dynamic ...
1Abstract – We consider the speed of convergence of an instance of the binary interval consensus, a ...
International audienceResults for estimating the convergence rate of nonstationary distributed conse...
This article evaluates convergence rates of binary majority consensus algorithms in networks with di...
We propose three new algorithms for the distributed averaging and consensus prob-lems: two for the f...
The problem of self-coordination of a network of dynamical systems toward a common state is often re...
Abstract — Characterizing convergence speed is one of the important research challenges in the desig...
We analyze a class of distributed quantized consensus algorithms for arbitrary networks. In the init...
This paper gives a lower bound on the convergence rate of a class of network consensus algorithms. T...
We study the convergence speed of distributed iterative algorithms for the consensus and averaging p...
The problem addressed in this paper is the analysis of a distributed consensus algorithm for arbitra...
The quantities of coefficient of ergodicity and algebraic connectivity have been used to estimate th...
We consider a consensus algorithm in which every nodein a sequence of undirected, B-connected graphs...
We consider a consensus algorithm in which every node in a time-varying undirected connected graph a...
In this work we study the performance of asymptotic and approximate consensus algorithms in dynamic ...
1Abstract – We consider the speed of convergence of an instance of the binary interval consensus, a ...
International audienceResults for estimating the convergence rate of nonstationary distributed conse...
This article evaluates convergence rates of binary majority consensus algorithms in networks with di...
We propose three new algorithms for the distributed averaging and consensus prob-lems: two for the f...
The problem of self-coordination of a network of dynamical systems toward a common state is often re...
Abstract — Characterizing convergence speed is one of the important research challenges in the desig...
We analyze a class of distributed quantized consensus algorithms for arbitrary networks. In the init...