# bonpow

0th

Percentile

##### Find Bonacich Power Centrality Scores of Network Positions

bonpow takes a graph (dat) and returns the Boncich power centralities of positions (selected by nodes). The decay rate for power contributions is specified by exponent (1 by default).

Keywords
graphs
##### Usage
bonpow(graph, nodes=V(graph), loops=FALSE, exponent=1,
rescale=FALSE, tol=1e-7)
##### Arguments
graph
the input graph.
nodes
vertex sequence indicating which vertices are to be included in the calculation. By default, all vertices are included.
loops
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. loops is FALSE by default.
exponent
exponent (decay rate) for the Bonacich power centrality score; can be negative
rescale
if true, centrality scores are rescaled such that they sum to 1.
tol
tolerance for near-singularities during matrix inversion (see solve)
##### Details

Bonacich's power centrality measure is defined by $C_{BP}\left(\alpha,\beta\right)=\alpha\left(\mathbf{I}-\beta\mathbf{A}\right)^{-1}\mathbf{A}\mathbf{1}$, where $\beta$ is an attenuation parameter (set here by exponent) and $\mathbf{A}$ is the graph adjacency matrix. (The coefficient $\alpha$ acts as a scaling parameter, and is set here (following Bonacich (1987)) such that the sum of squared scores is equal to the number of vertices. This allows 1 to be used as a reference value for the middle'' of the centrality range.) When $\beta \rightarrow 1/\lambda_{\mathbf{A}1}$ (the reciprocal of the largest eigenvalue of $\mathbf{A}$), this is to within a constant multiple of the familiar eigenvector centrality score; for other values of $\beta$, the behavior of the measure is quite different. In particular, $\beta$ gives positive and negative weight to even and odd walks, respectively, as can be seen from the series expansion $C_{BP}\left(\alpha,\beta\right)=\alpha \sum_{k=0}^\infty \beta^k \mathbf{A}^{k+1} \mathbf{1}$ which converges so long as $|\beta| < 1/\lambda_{\mathbf{A}1}$. The magnitude of $\beta$ controls the influence of distant actors on ego's centrality score, with larger magnitudes indicating slower rates of decay. (High rates, hence, imply a greater sensitivity to edge effects.)

Interpretively, the Bonacich power measure corresponds to the notion that the power of a vertex is recursively defined by the sum of the power of its alters. The nature of the recursion involved is then controlled by the power exponent: positive values imply that vertices become more powerful as their alters become more powerful (as occurs in cooperative relations), while negative values imply that vertices become more powerful only as their alters become weaker (as occurs in competitive or antagonistic relations). The magnitude of the exponent indicates the tendency of the effect to decay across long walks; higher magnitudes imply slower decay. One interesting feature of this measure is its relative instability to changes in exponent magnitude (particularly in the negative case). If your theory motivates use of this measure, you should be very careful to choose a decay parameter on a non-ad hoc basis.

##### Value

• A vector, containing the centrality scores.

##### Note

This function was ported (ie. copied) from the SNA package.

##### concept

Bonacich Power centrality

##### Warning

Singular adjacency matrices cause no end of headaches for this algorithm; thus, the routine may fail in certain cases. This will be fixed when I get a better algorithm. bonpow will not symmetrize your data before extracting eigenvectors; don't send this routine asymmetric matrices unless you really mean to do so.

##### References

Bonacich, P. (1972). Factoring and Weighting Approaches to Status Scores and Clique Identification.'' Journal of Mathematical Sociology, 2, 113-120.

Bonacich, P. (1987). Power and Centrality: A Family of Measures.'' American Journal of Sociology, 92, 1170-1182.

evcent and alpha.centrality

• bonpow
##### Examples
# Generate some test data from Bonacich, 1987:
g.c <- graph( c(1,2,1,3,2,4,3,5)-1, dir=FALSE)
g.d <- graph( c(1,2,1,3,1,4,2,5,3,6,4,7)-1, dir=FALSE)
g.e <- graph( c(1,2,1,3,1,4,2,5,2,6,3,7,3,8,4,9,4,10)-1, dir=FALSE)
g.f <- graph( c(1,2,1,3,1,4,2,5,2,6,2,7,3,8,3,9,3,10,4,11,4,12,4,13)-1, dir=FALSE)
# Compute Bonpow scores
for (e in seq(-0.5,.5, by=0.1)) {
print(round(bonpow(g.c, exp=e)[c(1,2,4)], 2))
}

for (e in seq(-0.4,.4, by=0.1)) {
print(round(bonpow(g.d, exp=e)[c(1,2,5)], 2))
}

for (e in seq(-0.4,.4, by=0.1)) {
print(round(bonpow(g.e, exp=e)[c(1,2,5)], 2))
}

for (e in seq(-0.4,.4, by=0.1)) {
print(round(bonpow(g.f, exp=e)[c(1,2,5)], 2))
}
Documentation reproduced from package igraph, version 0.5.2-2, License: GPL (>= 2)

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