Add to ORKGWe give faster algorithms for producing sparse approximations of the transition matrices of $k$-step random walks on undirected, weighted graphs. These transition matrices also form graphs, and arise as intermediate objects in a variety of graph algorithms. Our improvements are based on a better understanding of processes that sample such walks, as well as tighter bounds on key weights underlying these sampling processes. On a graph with $n$ vertices and $m$ edges, our algorithm produces a graph with about $n\log{n}$ edges that approximates the $k$-step random walk graph in about $m + n \log^4{n}$ time. In order to obtain this runtime bound, we also revisit "density independent" algorithms for sparsifying graphs whose runtime overhead is ex...
The independence number of a sparse random graph G(n, m) of average degree d = 2m/n is well-known to...
In this last lecture we will discuss graph sparsification: approximating a graph by weighted sub-gra...
The problem of detecting dense subgraphs (\emph{communities}) in large sparse graphs is inherent to ...
We give faster algorithms for producing sparse approximations of the transition matrices of k-step r...
We give faster algorithms for producing sparse approximations of the transition matrices of $k$-step...
We present a general framework for constructing cut sparsifiers in undirected graphs --- weighted su...
We analyse the cover time of a random walk on a random graph of a given degree sequence. Weights are...
We present a general framework for constructing cut sparsifiers in undirected graphs- weighted subgr...
We present three spectral sparsification algorithms that, on input a graph G with n vertices and m e...
In this paper, we provide faster algorithms for computing variousfundamental quantities associated w...
Let G be a graph with n vertices and m edges. A sparsifier of G is a sparse graph on the same vertex...
The theory of rapid mixing random walks plays a fundamental role in the study of modern randomised a...
In this paper, we set forth a new algorithm for generating approximately uniformly random spanning t...
An algorithm observes the trajectories of random walks over an unknown graph $G$, starting from the ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
The independence number of a sparse random graph G(n, m) of average degree d = 2m/n is well-known to...
In this last lecture we will discuss graph sparsification: approximating a graph by weighted sub-gra...
The problem of detecting dense subgraphs (\emph{communities}) in large sparse graphs is inherent to ...
We give faster algorithms for producing sparse approximations of the transition matrices of k-step r...
We give faster algorithms for producing sparse approximations of the transition matrices of $k$-step...
We present a general framework for constructing cut sparsifiers in undirected graphs --- weighted su...
We analyse the cover time of a random walk on a random graph of a given degree sequence. Weights are...
We present a general framework for constructing cut sparsifiers in undirected graphs- weighted subgr...
We present three spectral sparsification algorithms that, on input a graph G with n vertices and m e...
In this paper, we provide faster algorithms for computing variousfundamental quantities associated w...
Let G be a graph with n vertices and m edges. A sparsifier of G is a sparse graph on the same vertex...
The theory of rapid mixing random walks plays a fundamental role in the study of modern randomised a...
In this paper, we set forth a new algorithm for generating approximately uniformly random spanning t...
An algorithm observes the trajectories of random walks over an unknown graph $G$, starting from the ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
The independence number of a sparse random graph G(n, m) of average degree d = 2m/n is well-known to...
In this last lecture we will discuss graph sparsification: approximating a graph by weighted sub-gra...
The problem of detecting dense subgraphs (\emph{communities}) in large sparse graphs is inherent to ...