论文信息 - A Note on the Eigenvalues of the Google Matrix

A Note on the Eigenvalues of the Google Matrix

The Google matrix is a positive, column-stochastic matrix that is used to compute the pagerank of all the web pages on the Internet: the eigenvector corresponding to the eigenvalue 1 is the pagerank vector. Due to its huge dimension, of the order of billions, the (presently) only viable method to compute the eigenvector is the power method. For the convergence of the iteration, it is essential to know the eigenvalue distribution of the matrix. A theorem concerning the eigenvalues was recently proved by Langville and Meyer. In this note another proof is given.

L. Eldén

[1] Gene H. Golub,et al. Matrix computations , 1983 .

[2] Gene H. Golub,et al. Matrix computations (3rd ed.) , 1996 .

[3] Sergey Brin,et al. The Anatomy of a Large-Scale Hypertextual Web Search Engine , 1998, Comput. Networks.

[4] Rajeev Motwani,et al. The PageRank Citation Ranking : Bringing Order to the Web , 1999, WWW 1999.

[5] Carl D. Meyer,et al. Matrix Analysis and Applied Linear Algebra , 2000 .

[6] Gene H. Golub,et al. Extrapolation methods for accelerating PageRank computations , 2003, WWW '03.

[7] Carl D. Meyer,et al. Deeper Inside PageRank , 2004, Internet Math..

[8] Gene H. Golub,et al. Exploiting the Block Structure of the Web for Computing , 2003 .

[9] Taher H. Haveliwala,et al. The Second Eigenvalue of the Google Matrix , 2003 .

[10] Carl D. Meyer,et al. Fiddling with pagerank , 2003 .

[11] Taher H. Haveliwala,et al. Adaptive methods for the computation of PageRank , 2004 .