stresscent: Compute the Stress Centrality Scores of Network Positions

Description

stresscent takes a graph stack (dat) and returns the stress centralities of positions within one graph (indicated by nodes and g, respectively). Depending on the specified mode, stress on directed or undirected geodesics will be returned; this function is compatible with centralization, and will return the theoretical maximum absolute deviation (from maximum) conditional on size (which is used by centralization to normalize the observed centralization score).

Usage

stresscent(dat, g=1, nodes=c(1:dim(dat)[2]), gmode="digraph", 
    diag=FALSE, tmaxdev=FALSE, cmode="directed", 
    geodist.precomp=NULL, rescale=FALSE)

Arguments

dat

Data array to be analyzed. By assumption, the first dimension of the array indexes the graph, with the next two indexing the actors. Alternately, this can be an n x n matrix (if only one graph is involved).

Integer indicating the index of the graph for which centralities are to be calculated. By default, g==1.

nodes

List indicating which nodes are to be included in the calculation. By default, all nodes are included.

gmode

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

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.

tmaxdev

Boolean indicating whether or not the theoretical maximum absolute deviation from the maximum nodal centrality should be returned. By default, tmaxdev==FALSE.

cmode

String indicating the type of betweenness centrality being computed (directed or undirected geodesics).

geodist.precomp

A geodist object precomputed for the graph to be analyzed (optional)

rescale

If true, centrality scores are rescaled such that they sum to 1.

Value

A vector of centrality scores

Details

The stress of a vertex, v, is given by

$$C_S(v) = \sum_{i,j : i \neq j,i \neq v,j \neq v} g_{ivj}$$

where $g_{ijk}$ is the number of geodesics from i to k through j. Conceptually, high-stress vertices lie on a large number of shortest paths between other vertices; they can thus be thought of as ``bridges'' or ``boundary spanners.'' Compare this with betweenness, which considers only non-redundant shortest paths.

Examples

Run this code

g<-rgraph(10)     #Draw a random graph with 10 members
stresscent(g)     #Compute stress scores