Description

gcor finds the product-moment correlation between the adjacency matrices of graphs indicated by g1 and g2 in stack dat (or possibly dat2). Missing values are permitted.

Usage

Arguments

Details

The (product moment) graph correlation between labeled graphs G and H is given by

cor(G,H) = cov(G,V)/sqrt(cov(G,G)cov(H,H))

where the graph covariance is defined as

cov(G,H) = sum( (A^G_ij-mu_G)(A^H_ij-mu_H), {i,j} )/Choose(|V|,2)

(with A^G being the adjacency matrix of G). The graph correlation/covariance is at the center of a number of graph comparison methods, including network variants of regression analysis, PCA, CCA, and the like.

Note that gcor computes only the correlation between uniquely labeled graphs. For the more general case, gscor is recommended.

Value

A graph correlation matrix

Note

The gcor routine is really just a front-end to the standard cor method; the primary value-added is the transparent vectorization of the input graphs (with intelligent handling of simple versus directed graphs, diagonals, etc.). As noted, the correlation coefficient returned is a standard Pearson's product-moment coefficient, and output should be interpreted accordingly. Classical null hypothesis testing procedures are not recommended for use with graph correlations; for nonparametric null hypothesis testing regarding graph correlations, see cugtest and qaptest. For multivariate correlations among graph sets, try netcancor.

Author(s)

Carter T. Butts buttsc@uci.edu

References

Butts, C.T., and Carley, K.M. (2001). “Multivariate Methods for Interstructural Analysis.” CASOS Working Paper, Carnegie Mellon University.

Krackhardt, D. (1987). “QAP Partialling as a Test of Spuriousness.” Social Networks, 9, 171-86

See Also

gscor, gcov, gscov

Examples