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sna (version 2.4)

sdmat: Estimate the Structural Distance Matrix for a Graph Stack

Description

Estimates the structural distances among all elements of dat using the method specified in method.

Usage

sdmat(dat, normalize=FALSE, diag=FALSE, mode="digraph", 
    output="matrix", method="mc", exchange.list=NULL, ...)

Arguments

dat

graph set to be analyzed.

normalize

divide by the number of available dyads?

diag

boolean indicating whether or not the diagonal should be treated as valid data. Set this true if and only if the data can contain loops. diag is FALSE by default.

mode

string indicating the type of graph being evaluated. "digraph" indicates that edges should be interpreted as directed; "graph" indicates that edges are undirected. mode is set to "digraph" by default.

output

"matrix" for matrix output, "dist" for a dist object.

method

method to be used to search the space of accessible permutations; must be one of "none", "exhaustive", "anneal", "hillclimb", or "mc".

exchange.list

information on which vertices are exchangeable (see below); this must be a single number, a vector of length n, or a nx2 matrix.

additional arguments to lab.optimize.

Value

A matrix of distances (or an object of class dist)

Warning

The search process can be very slow, particularly for large graphs. In particular, the exhaustive method is order factorial, and will take approximately forever for unlabeled graphs of size greater than about 7-9.

Details

The structural distance between two graphs G and H is defined as $$d_S\left(G,H \left| L_G,L_H\right.\right) = \min_{L_G,L_H} d\left(\ell\left(G\right),\ell\left(H\right)\right)$$ where \(L_G\) is the set of accessible permutations/labelings of G, and \(\ell(G)\) is a permuation/relabeling of the vertices of G (\(\ell(G) \in L_G\)). The set of accessible permutations on a given graph is determined by the theoretical exchangeability of its vertices; in a nutshell, two vertices are considered to be theoretically exchangeable for a given problem if all predictions under the conditioning theory are invariant to a relabeling of the vertices in question (see Butts and Carley (2001) for a more formal exposition). Where no vertices are exchangeable, the structural distance becomes the its labeled counterpart (here, the Hamming distance). Where all vertices are exchangeable, the structural distance reflects the distance between unlabeled graphs; other cases correspond to distance under partial labeling.

The accessible permutation set is determined by the exchange.list argument, which is dealt with in the following manner. First, exchange.list is expanded to fill an nx2 matrix. If exchange.list is a single number, this is trivially accomplished by replication; if exchange.list is a vector of length n, the matrix is formed by cbinding two copies together. If exchange.list is already an nx2 matrix, it is left as-is. Once the nx2 exchangeabiliy matrix has been formed, it is interpreted as follows: columns refer to graphs 1 and 2, respectively; rows refer to their corresponding vertices in the original adjacency matrices; and vertices are taken to be theoretically exchangeable iff their corresponding exchangeability matrix values are identical. To obtain an unlabeled distance (the default), then, one could simply let exchange.list equal any single number. To obtain the Hamming distance, one would use the vector 1:n.

Because the set of accessible permutations is, in general, very large (\(o(n!)\)), searching the set for the minimum distance is a non-trivial affair. Currently supported methods for estimating the structural distance are hill climbing, simulated annealing, blind monte carlo search, or exhaustive search (it is also possible to turn off searching entirely). Exhaustive search is not recommended for graphs larger than size 8 or so, and even this may take days; still, this is a valid alternative for small graphs. Blind monte carlo search and hill climbing tend to be suboptimal for this problem and are not, in general recommended, but they are available if desired. The preferred (and default) option for permutation search is simulated annealing, which seems to work well on this problem (though some tinkering with the annealing parameters may be needed in order to get optimal performance). See the help for lab.optimize for more information regarding these options.

Structural distance matrices may be used in the same manner as any other distance matrices (e.g., with multidimensional scaling, cluster analysis, etc.) Classical null hypothesis tests should not be employed with structural distances, and QAP tests are almost never appropriate (save in the uniquely labeled case). See cugtest for a more reasonable alternative.

References

Butts, C.T. and Carley, K.M. (2005). “Some Simple Algorithms for Structural Comparison.” Computational and Mathematical Organization Theory, 11(4), 291-305.

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

See Also

hdist, structdist

Examples

Run this code
# NOT RUN {
#Generate two random graphs
g<-array(dim=c(3,5,5))
g[1,,]<-rgraph(5)
g[2,,]<-rgraph(5)

#Copy one of the graphs and permute it
g[3,,]<-rmperm(g[2,,])

#What are the structural distances between the labeled graphs?
sdmat(g,exchange.list=1:5)

#What are the structural distances between the underlying unlabeled 
#graphs?
sdmat(g,method="anneal", prob.init=0.9, prob.decay=0.85, 
    freeze.time=50, full.neighborhood=TRUE)
# }

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