Random walk based distributed algorithms make use of a token that circulates in the system according to a random walk scheme to achieve their goal. To study their efficiency and compare it to one of the deterministic solutions, one is led to compute certain quantities, namely the hitting times and the cover time. Until now, only bounds on these quantities were defined. First, this paper presents two generalizations of the notions of hitting and cover times to weighted graphs. Indeed, the properties of random walks on symmetrically weighted graphs provide interesting results on random walk based distributed algorithms, such as local load balancing. Both of these generalization are proposed to precisely represent the behaviour of these algori...
Abstract Random walks on graphs are an essential primitive for many randomised algorithms and sto...
Random walks in graphs have been applied to various network exploration and network maintenance prob...
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...
This thesis studies the cover time of random walks on finite connected graphs. Work contains the der...
A simple random walk on a graph is a sequence of movements from one vertex to another where at each ...
AbstractStandard random walks on finite graphs select the vertex visited next to the adjacent vertic...
We analyse the cover time of a random walk on a random graph of a given degree sequence. Weights are...
This thesis is a contribution to the covering times problems for random walks on graphs. By consider...
We focus on the problem of performing random walks efficiently in a distributed network. Given bandw...
Performing random walks in networks is a fundamental primitive that has found applications in many a...
This thesis studies random walks and its algorithmic applications in distributed networks. Random wa...
The paper investigates efficient distributed computation in dynamic networks in which the network to...
We prove upper and lower bounds and give an approximation algorithm for the cover time of the random...
ABSTRACT: Motivated by applications in Markov estimation and distributed computing, we define the bl...
Abstract Random walks on graphs are an essential primitive for many randomised algorithms and sto...
Abstract Random walks on graphs are an essential primitive for many randomised algorithms and sto...
Random walks in graphs have been applied to various network exploration and network maintenance prob...
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...
This thesis studies the cover time of random walks on finite connected graphs. Work contains the der...
A simple random walk on a graph is a sequence of movements from one vertex to another where at each ...
AbstractStandard random walks on finite graphs select the vertex visited next to the adjacent vertic...
We analyse the cover time of a random walk on a random graph of a given degree sequence. Weights are...
This thesis is a contribution to the covering times problems for random walks on graphs. By consider...
We focus on the problem of performing random walks efficiently in a distributed network. Given bandw...
Performing random walks in networks is a fundamental primitive that has found applications in many a...
This thesis studies random walks and its algorithmic applications in distributed networks. Random wa...
The paper investigates efficient distributed computation in dynamic networks in which the network to...
We prove upper and lower bounds and give an approximation algorithm for the cover time of the random...
ABSTRACT: Motivated by applications in Markov estimation and distributed computing, we define the bl...
Abstract Random walks on graphs are an essential primitive for many randomised algorithms and sto...
Abstract Random walks on graphs are an essential primitive for many randomised algorithms and sto...
Random walks in graphs have been applied to various network exploration and network maintenance prob...
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...