Faster way to calculate the number of shortest paths a vertex belongs to using Networkx

I am considering that the Stress of a vertex i is the number of shortest paths between all pairs of vertices that i belongs to.

I am trying to calculate it using Networkx, I've made in three ways so far. The readable, dirty, and dirtiest but none of them is fast. Actually, I would like it to be faster than the betweenness (source) present on Networkx. Is there a better way to calculate that? Thanks in advance for any suggestion, answer or comment. Following see what I did so far:

Ps.: Here is a pastie with the code ready to go if you want give it a try, thanks again.

Here is the common part on all versions:

``````import networkx as nx
from collections import defaultdict
``````

Dirtiest, brace yourselves:

``````def stress_centrality_dirtiest(g):

stress = defaultdict(int)

for a in nx.nodes_iter(g):
for b in nx.nodes_iter(g):
if a==b:
continue
# pred = nx.predecessor(G,b)  # for unweighted graphs
pred, distance = nx.dijkstra_predecessor_and_distance(g,b)  # for weighted graphs
if not pred.has_key(a):
return []
path = [[a,0]]
path_length = 1
index = 0
while index >= 0:
n,i = path[index]
if n == b:
for vertex in map(lambda x:x[0], path[:index+1])[1:-1]:
stress[vertex] += 1
if len(pred[n]) > i:
index += 1
if index == path_length:
path.append([pred[n][i],0])
path_length += 1
else:
path[index] = [pred[n][i],0]
else:
index -= 1
if index >= 0:
path[index][4] += 1
return stress
``````

Dirty

``````def stress_centrality_dirty(g):

stress = defaultdict(int)

paths = nx.all_pairs_dijkstra_path(g)
for item in paths.values():
for element in item.values():
if len(element) > 2:
for vertex in element[1:-1]:
stress[vertex] += 1
return stress
``````

``````def stress_centrality_readable(g):

stress = defaultdict(int)

paths = nx.all_pairs_dijkstra_path(g)
for source in nx.nodes_iter(g):
for end in nx.nodes_iter(g):
if source == end:
continue
path = paths[source][end]
if len(path) > 2:                                         # path must contains at least 3 vertices source - another node - end
for vertex in path[1:-1]:                               # when counting the number of occurrencies, exclude source and end vertices
stress[vertex] += 1
return stress
``````
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The betweenness code you pointed to in NetworkX does almost what you want and can be adjusted easily.

In the betweenness function if you call the following (instead of _accumulate_basic) during the "accumulate" stage it should calculate the stress centrality (untested)

``````def _accumulate_stress(betweenness,S,P,sigma,s):
delta = dict.fromkeys(S,0)
while S:
w = S.pop()
for v in P[w]:
delta[v] += (1.0+delta[w])
if w != s:
betweenness[w] += sigma[w]*delta[w]
return betweenness
``````

See the paper Ulrik Brandes: On Variants of Shortest-Path Betweenness Centrality and their Generic Computation. Social Networks 30(2):136-145, 2008. http://www.inf.uni-konstanz.de/algo/publications/b-vspbc-08.pdf

The stress centrality algorithm is Algorithm 12.

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Perfect! Thanks a ton! –  Eduardo Jun 13 '13 at 21:37