AbstractUsing combinatorial and analytic techniques, we give conditioning bounds for the stationary vector πT of a stochastic matrix of the form cA+(1−c)B, where c∈(0,1) is a scalar, and A and B are stochastic matrices, the latter being rank one. Such matrices and their stationary vectors arise as a key component in Google’s PageRank algorithm. The conditioning bounds considered include normwise, absolute componentwise, and relative componentwise, and the bounds depend on c, and on quantities such as the number of dangling nodes (which correspond to rows of A having all entries equal), or the lengths of certain cycles in the directed graph associated with A. It is shown that if vertex j is on only long cycles in that directed graph, then th...
Abstract. We determine analytically the modulus of the second eigenvalue for the web hyperlink matri...
We consider the web hyperlink matrix used by Google for computing the PageRank whose form is given b...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...
AbstractUsing combinatorial and analytic techniques, we give conditioning bounds for the stationary ...
Abstract. We present a simple algorithm for computing the PageRank (stationary distribution) of the ...
AbstractComputing Google’s PageRank via lumping the Google matrix was recently analyzed in [I.C.F. I...
AbstractThe spectral and Jordan structures of the Web hyperlink matrix G(c)=cG+(1−c)evT have been an...
Abstract. This document contains details of numerical experiments performed to illustrate the theore...
The spectral and Jordan structures of the web hyperlink matrix G(c) = cG + (1 − c)evT have been anal...
A Google-like matrix is a positive stochastic matrix given by a convex combination of a sparse, nonn...
The spectral and Jordan structures of the Web hyperlink matrix $G(c) = cG + (1-c)ev^T$ have been an...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...
With no doubt, Google is currently the most widely used search engine on the Web. Behind its success...
P ̃ is the stochastic reducible matrix, without dangling nodes, related to the Google matrix P ∈ Rp×...
Abstract. We determine analytically the modulus of the second eigenvalue for the web hyperlink matri...
We consider the web hyperlink matrix used by Google for computing the PageRank whose form is given b...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...
AbstractUsing combinatorial and analytic techniques, we give conditioning bounds for the stationary ...
Abstract. We present a simple algorithm for computing the PageRank (stationary distribution) of the ...
AbstractComputing Google’s PageRank via lumping the Google matrix was recently analyzed in [I.C.F. I...
AbstractThe spectral and Jordan structures of the Web hyperlink matrix G(c)=cG+(1−c)evT have been an...
Abstract. This document contains details of numerical experiments performed to illustrate the theore...
The spectral and Jordan structures of the web hyperlink matrix G(c) = cG + (1 − c)evT have been anal...
A Google-like matrix is a positive stochastic matrix given by a convex combination of a sparse, nonn...
The spectral and Jordan structures of the Web hyperlink matrix $G(c) = cG + (1-c)ev^T$ have been an...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...
With no doubt, Google is currently the most widely used search engine on the Web. Behind its success...
P ̃ is the stochastic reducible matrix, without dangling nodes, related to the Google matrix P ∈ Rp×...
Abstract. We determine analytically the modulus of the second eigenvalue for the web hyperlink matri...
We consider the web hyperlink matrix used by Google for computing the PageRank whose form is given b...
Let S be a column stochastic matrix with at least one full row. Then S describes a Pagerank-like ran...