AbstractWe investigate important combinatorial and algorithmic properties of Gn,m,p random intersection graphs. In particular, we prove that with high probability (a) random intersection graphs are expanders, (b) random walks on such graphs are “rapidly mixing” (in particular they mix in logarithmic time) and (c) the cover time of random walks on such graphs is optimal (i.e. it is Θ(nlogn)). All results are proved for p very close to the connectivity threshold and for the interesting, non-trivial range where random intersection graphs differ from classical Gn,p random graphs
We establish and generalise several bounds for various random walk quantities including the mixing t...
We study random walks on the giant component of Hyperbolic Random Graphs (HRGs), in the regime when ...
We study properties of multiple random walks on a graph under various assumptions of interaction bet...
AbstractWe investigate important combinatorial and algorithmic properties of Gn,m,p random intersect...
AbstractWe investigate the existence and efficient algorithmic construction of close to optimal inde...
AbstractWe describe a polynomial time algorithm for covering graphs with cliques, prove its asymptot...
AbstractRandom Intersection Graphs, Gn,m,p, is a class of random graphs introduced in Karoński (1999...
AbstractIn the uniform random intersection graphs model, denoted by Gn,m,λ, to each vertex v we assi...
AbstractA uniform random intersection graph G(n,m,k) is a random graph constructed as follows. Label...
AbstractThe cover time and mixing time of graphs has much relevance to algorithmic applications and ...
Random walks in graphs have been applied to various network exploration and network maintenance prob...
AbstractWe study properties of the uniform random intersection graph model G(n,m,d). We find asympto...
We apply the power-of-two-choices paradigm to a random walk on a graph: rather than moving to a unif...
We apply the power-of-two-choices paradigm to a random walk on a graph: rather than moving to a uni...
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...
We establish and generalise several bounds for various random walk quantities including the mixing t...
We study random walks on the giant component of Hyperbolic Random Graphs (HRGs), in the regime when ...
We study properties of multiple random walks on a graph under various assumptions of interaction bet...
AbstractWe investigate important combinatorial and algorithmic properties of Gn,m,p random intersect...
AbstractWe investigate the existence and efficient algorithmic construction of close to optimal inde...
AbstractWe describe a polynomial time algorithm for covering graphs with cliques, prove its asymptot...
AbstractRandom Intersection Graphs, Gn,m,p, is a class of random graphs introduced in Karoński (1999...
AbstractIn the uniform random intersection graphs model, denoted by Gn,m,λ, to each vertex v we assi...
AbstractA uniform random intersection graph G(n,m,k) is a random graph constructed as follows. Label...
AbstractThe cover time and mixing time of graphs has much relevance to algorithmic applications and ...
Random walks in graphs have been applied to various network exploration and network maintenance prob...
AbstractWe study properties of the uniform random intersection graph model G(n,m,d). We find asympto...
We apply the power-of-two-choices paradigm to a random walk on a graph: rather than moving to a unif...
We apply the power-of-two-choices paradigm to a random walk on a graph: rather than moving to a uni...
AbstractWe study the cover time of multiple random walks on undirected graphs G=(V,E). We consider k...
We establish and generalise several bounds for various random walk quantities including the mixing t...
We study random walks on the giant component of Hyperbolic Random Graphs (HRGs), in the regime when ...
We study properties of multiple random walks on a graph under various assumptions of interaction bet...