This article deals with random walks on arbitrary graphs. We consider the cover time of finite graphs. That is, we study the expected time needed for a random walk on a finite graph to visit every vertex at least once. We establish an upper bound of O(n²) for the expectation of the cover time for regular (or nearly regular) graphs. We prove a lower bound of s log n) for the expected cover time for trees. We present examples showing all our bounds to be tight.
Consider the following stochastic process on a graph: initially all vertices are uncovered and at ea...
ABSTRACT: Motivated by applications in Markov estimation and distributed computing, we define the bl...
Abstract. We show a special feature for the cover time of trees that is not satisfied by those of ot...
This thesis is a contribution to the covering times problems for random walks on graphs. By consider...
We prove that the expected time for a random walk to cover all n vertices of a graph is at least (1 ...
A simple random walk on a graph is a sequence of movements from one vertex to another where at each ...
Let r 3 be integer, and let G r denote the set of r-regular graphs with vertex set V = f1; 2; : : ...
The cover time of a random walk on a finite graph is defined to be the number of steps it takes to h...
This thesis studies the cover time of random walks on finite connected graphs. Work contains the der...
AbstractFor simple random walk on a finite tree, the cover time is the time taken to visit every ver...
We prove upper and lower bounds and give an approximation algorithm for the cover time of the random...
We consider the cover time Eu [G], the expected time it takes a random walk that starts at u to visi...
AbstractIt is shown that if G is any connected graph on n vertices, then the cover time for random w...
We study a random walk that prefers to use unvisited edges in the context of random cubic graphs, i....
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...
Consider the following stochastic process on a graph: initially all vertices are uncovered and at ea...
ABSTRACT: Motivated by applications in Markov estimation and distributed computing, we define the bl...
Abstract. We show a special feature for the cover time of trees that is not satisfied by those of ot...
This thesis is a contribution to the covering times problems for random walks on graphs. By consider...
We prove that the expected time for a random walk to cover all n vertices of a graph is at least (1 ...
A simple random walk on a graph is a sequence of movements from one vertex to another where at each ...
Let r 3 be integer, and let G r denote the set of r-regular graphs with vertex set V = f1; 2; : : ...
The cover time of a random walk on a finite graph is defined to be the number of steps it takes to h...
This thesis studies the cover time of random walks on finite connected graphs. Work contains the der...
AbstractFor simple random walk on a finite tree, the cover time is the time taken to visit every ver...
We prove upper and lower bounds and give an approximation algorithm for the cover time of the random...
We consider the cover time Eu [G], the expected time it takes a random walk that starts at u to visi...
AbstractIt is shown that if G is any connected graph on n vertices, then the cover time for random w...
We study a random walk that prefers to use unvisited edges in the context of random cubic graphs, i....
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...
Consider the following stochastic process on a graph: initially all vertices are uncovered and at ea...
ABSTRACT: Motivated by applications in Markov estimation and distributed computing, we define the bl...
Abstract. We show a special feature for the cover time of trees that is not satisfied by those of ot...