In this work, a non-stationary technique based on the Power method for accelerating the parallel computation of the PageRank vector is proposed and its theoretical convergence analyzed. This iterative non-stationary model, which uses the eigenvector formulation of the PageRank problem, reduces the needed computations for obtaining the PageRank vector by eliminating synchronization points among processes, in such a way that, at each iteration of the Power method, the block of iterate vector assigned to each process can be locally updated more than once, before performing a global synchronization. The parallel implementation of several strategies combining this novel non-stationary approach and the extrapolation methods has been developed usi...
A power method formulation, which efficiently handles the problem of dangling pages, is investigated...
We observe that the convergence patterns of pages in the PageRank algorithm have a nonuniform distri...
PageRank kernel is a standard benchmark addressing various graph processing and analytical problems....
In this work, a non-stationary technique based on the Power method for accelerating the parallel com...
In this paper, parallel Relaxed and Extrapolated algorithms based on the Power method for accelerati...
The PageRank algorithm for determining the importance of Web pages has become a central technique in...
In this work we present parallel algorithms based on the use of two-stage methods for solving the Pa...
We present a stationary iterative scheme for PageRank computation. The algorithm is based on a linea...
AbstractWe observe that the convergence patterns of pages in the PageRank algorithm have a nonunifor...
For computing PageRank problems, a Power–Arnoldi algorithm is presented by periodically knitting the...
Cataloged from PDF version of article.The PageRank algorithm is an important component in effective ...
The PageRank algorithm is an important component in effective web search. At the core of this algori...
In this note we consider a simple reformulation of the traditional power iteration algorithm for com...
The PageRank method is an important and basic component in effective web search to compute the rank ...
Abstract. We present a novel technique for speeding up the computation of PageRank, a hyperlink-base...
A power method formulation, which efficiently handles the problem of dangling pages, is investigated...
We observe that the convergence patterns of pages in the PageRank algorithm have a nonuniform distri...
PageRank kernel is a standard benchmark addressing various graph processing and analytical problems....
In this work, a non-stationary technique based on the Power method for accelerating the parallel com...
In this paper, parallel Relaxed and Extrapolated algorithms based on the Power method for accelerati...
The PageRank algorithm for determining the importance of Web pages has become a central technique in...
In this work we present parallel algorithms based on the use of two-stage methods for solving the Pa...
We present a stationary iterative scheme for PageRank computation. The algorithm is based on a linea...
AbstractWe observe that the convergence patterns of pages in the PageRank algorithm have a nonunifor...
For computing PageRank problems, a Power–Arnoldi algorithm is presented by periodically knitting the...
Cataloged from PDF version of article.The PageRank algorithm is an important component in effective ...
The PageRank algorithm is an important component in effective web search. At the core of this algori...
In this note we consider a simple reformulation of the traditional power iteration algorithm for com...
The PageRank method is an important and basic component in effective web search to compute the rank ...
Abstract. We present a novel technique for speeding up the computation of PageRank, a hyperlink-base...
A power method formulation, which efficiently handles the problem of dangling pages, is investigated...
We observe that the convergence patterns of pages in the PageRank algorithm have a nonuniform distri...
PageRank kernel is a standard benchmark addressing various graph processing and analytical problems....