As long as a square nonnegative matrix A contains sufficient nonzero elements, then the Sinkhorn-Knopp algorithm can be used to balance the matrix, that is, to find a diagonal scaling of A that is doubly stochastic. It is known that the convergence is linear, and an upper bound has been given for the rate of convergence for positive matrices. In this paper we give an explicit expression for the rate of convergence for fully indecomposable matrices. We describe how balancing algorithms can be used to give a measure of web page significance. We compare the measure with some well known alternatives, including PageRank. We show that, with an appropriate modi. cation, the Sinkhorn-Knopp algorithm is a natural candidate for computing the measure ...
21 pagesThe HOTS algorithm uses the hyperlink structure of the web to compute a vector of scores wit...
There has been much interest recently in the problem of rank aggregation from pairwise data. A natur...
An $n\times n$ matrix $S = \bmat s_{i,j} \emat$ with nonnegative coordinates is \emph{doubly stochas...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the Sinkhorn-Kno...
As long as a square nonnegative matrix $A$ contains sufficient nonzero elements, the Sinkhorn-Knopp...
Abstract. As long as a square nonnegative matrix A contains sufficient nonzero elements, then the ma...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the matrix can b...
AbstractNew methods for scaling square, nonnegative matrices to doubly stochastic form are described...
Given a non-negative real matrix A, the matrix scaling problem is to determine if it is possible to ...
AbstractLet DN be the set N × N stochastic matrices without zero columns. Starting with a matrix A(0...
Abstract. The PageRank updating algorithm proposed by Langville and Meyer is a special case of an it...
It is shown that the problem of balancing a nonnegative matrix by positive diagonal matrices can be ...
Matrix scaling is an operation on nonnegative matrices with nonzero permanent. It multiplies the row...
Abstract: It is of increasing importance to develop learning meth-ods for ranking. In contrast to ma...
AbstractMatrix scaling problems have been extensively studied since Sinkhorn established in 1964 the...
21 pagesThe HOTS algorithm uses the hyperlink structure of the web to compute a vector of scores wit...
There has been much interest recently in the problem of rank aggregation from pairwise data. A natur...
An $n\times n$ matrix $S = \bmat s_{i,j} \emat$ with nonnegative coordinates is \emph{doubly stochas...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the Sinkhorn-Kno...
As long as a square nonnegative matrix $A$ contains sufficient nonzero elements, the Sinkhorn-Knopp...
Abstract. As long as a square nonnegative matrix A contains sufficient nonzero elements, then the ma...
As long as a square nonnegative matrix A contains sufficient nonzero elements, then the matrix can b...
AbstractNew methods for scaling square, nonnegative matrices to doubly stochastic form are described...
Given a non-negative real matrix A, the matrix scaling problem is to determine if it is possible to ...
AbstractLet DN be the set N × N stochastic matrices without zero columns. Starting with a matrix A(0...
Abstract. The PageRank updating algorithm proposed by Langville and Meyer is a special case of an it...
It is shown that the problem of balancing a nonnegative matrix by positive diagonal matrices can be ...
Matrix scaling is an operation on nonnegative matrices with nonzero permanent. It multiplies the row...
Abstract: It is of increasing importance to develop learning meth-ods for ranking. In contrast to ma...
AbstractMatrix scaling problems have been extensively studied since Sinkhorn established in 1964 the...
21 pagesThe HOTS algorithm uses the hyperlink structure of the web to compute a vector of scores wit...
There has been much interest recently in the problem of rank aggregation from pairwise data. A natur...
An $n\times n$ matrix $S = \bmat s_{i,j} \emat$ with nonnegative coordinates is \emph{doubly stochas...