Kamvar | SuiteSparse Matrix Collection

Group Description	Web matrices from Sep Kamvar, Stanford University. * Stanford Web Matrix: 281903 pages, ~2.3 million links. From a September 2002 crawl. * Stanford-Berkeley Web Matrix: 683446 pages, ~7.6 million links. From a December 2002 crawl. The data comes fro the Stanford WebBase project, http://www-diglib.stanford.edu/~testbed/doc2/WebBase . The original data is posted at http://www.stanford.edu/~sdkamvar/research.html . In the data posted there, one of the matrices is normalized, and the other is not (but includes MATLAB code to produce the normalized matrix). Both have some non-binary values in their connectivity, which represents pages with more than one link to another specific page. The matrices posted here are purely binary, and correspond to the matrix G discussed in Chapter 2 of "Numerical Computing with MATLAB" by Cleve Moler and Kathryn Moler, http://www.mathworks.com/moler . In these matrices, if G(i,j)=1 then there is a link from page j to page i. Thus, column j of G reflects the links that you can click on, if you are visiting page j. A basic statement of the pagerank algorithm is given at http://www.mathworks.com/moler/ncm/pagerank.m , but that algorithm is not suited for these large problems. The methods posted at http://www.mathworks.com/moler/ncm/pagerankpow.m or http://www.stanford.edu/~sdkamvar/research.html are more suitable for these problems. The related eigenvalue problem is to find the vector x such that x=Ax, where A = (pGD + deltaee'), and: p = a scalar damping factor less than one (typically 0.85) G = the binary connectivity matrix (Problem.A in the MATLAB .mat files, or the .pua files). Don't confuse Problem.A with the matrix A = (pGD + deltae*e'). Problem.A is the matrix G, not A. D = a diagonal matrix with D (i,i) equal to the sum of column i of G delta = (1-p)/n e = the column vector of all one's The urls of the Stanford_Berkeley matrix are given in a cell array, Problem.colname. The url associate with column j is Problem.colname {j}. Only a few of these are given, corresponding to root urls. No urls are given for the Stanford matrix.

Web matrices from Sep Kamvar, Stanford University.

* Stanford Web Matrix:
    281903 pages, ~2.3 million links. From a September 2002 crawl.

* Stanford-Berkeley Web Matrix:
    683446 pages, ~7.6 million links. From a December 2002 crawl.

The data comes fro the Stanford WebBase project,
http://www-diglib.stanford.edu/~testbed/doc2/WebBase .

The original data is posted at http://www.stanford.edu/~sdkamvar/research.html .
In the data posted there, one of the matrices is normalized, and the other is
not (but includes MATLAB code to produce the normalized matrix).  Both have
some non-binary values in their connectivity, which represents pages with more
than one link to another specific page.  The matrices posted here are purely
binary, and correspond to the matrix G discussed in Chapter 2 of
"Numerical Computing with MATLAB" by Cleve Moler and Kathryn Moler,
http://www.mathworks.com/moler .

In these matrices, if G(i,j)=1 then there is a link from page j to page i.
Thus, column j of G reflects the links that you can click on, if you are
visiting page j.

A basic statement of the pagerank algorithm is given at
http://www.mathworks.com/moler/ncm/pagerank.m , but that algorithm is not
suited for these large problems.  The methods posted at
http://www.mathworks.com/moler/ncm/pagerankpow.m or 
http://www.stanford.edu/~sdkamvar/research.html 
are more suitable for these problems.

The related eigenvalue problem is to find the vector x such that x=A*x,
where A = (p*G*D + delta*e*e'), and:

    p = a scalar damping factor less than one (typically 0.85)
    G = the binary connectivity matrix (Problem.A in the MATLAB .mat files,
	or the .pua files).  Don't confuse Problem.A with the matrix
	A = (p*G*D + delta*e*e').  Problem.A is the matrix G, not A.
    D = a diagonal matrix with D (i,i) equal to the sum of column i of G
    delta = (1-p)/n
    e = the column vector of all one's

The urls of the Stanford_Berkeley matrix are given in a cell array,
Problem.colname.  The url associate with column j is Problem.colname {j}.
Only a few of these are given, corresponding to root urls.
No urls are given for the Stanford matrix.

Id	Name	Group	Rows	Cols	Nonzeros	Kind	Date	Download File
979	Stanford	Kamvar	281,903	281,903	2,312,497	Directed Graph	2003	MATLAB Rutherford Boeing Matrix Market
980	Stanford_Berkeley	Kamvar	683,446	683,446	7,583,376	Directed Graph	2003	MATLAB Rutherford Boeing Matrix Market

Group Kamvar