I'm using Python Networkx 2.1 to calculate Betweenness Centrality and Current Flow Betweenness Centrality on an undirected graph, with **weighted** edges.
My concern is about the meaning of the parameter 'weight' in the networkx functions. Please consider the graph given by the following example

```
G= nx.Graph()
G.add_path([1, 2,4])
G.add_path([1, 3,4])
G[1][2]['weight'] = 20
G[1][3]['weight'] = 1
G[2][4]['weight'] = 1
G[3][4]['weight'] = 1
for u,v,d in G.edges(data=True):
if 'weight' in d:
if d['weight'] != 0:
d['reciprocal'] = 1/d['weight']
```

Edges weight in my case is strength of relationship, therefore **something positive**. The idea is that edges with higher weights should contribute more to betweenness.
Given this idea, am I correct in saying that the right formulas to calculate node Weighted Betweenness Centrality and Weighted Current Flow Betweenness Centrality are the following?

```
b = nx.betweenness_centrality(G, weight= 'reciprocal', normalized=False)
Out[46]: {1: 1.0, 2: 1.0, 3: 0.0, 4: 0.0}
f = nx.current_flow_betweenness_centrality(G, normalized= False, weight= 'weight', solver='lu')
Out[48]:
{1: 1.3114754098360655,
2: 1.3114754098360657,
3: 0.6885245901639343,
4: 0.6885245901639347}
```

Please note that in the **first formula I used the reciprocal of edge weights** as it is my feeling that these are interpreted by the algorithm as distances, so something 'bad'.
In the **second formula**, on the other hand, **I used the original weight**, as in the algorithm of current flow betweenness it seems this gives more importance to nodes 1 and 2, as in betweenness. Therefore here weights seems to be 'positive'.

I'm wondering if I do something wrong. In fact, on larger graphs the two measures correlate more if I use the same weight parameter, and not the reciprocal.
**How is weight treated in these two algorithms?**

`betweenness_centrality`

on your graph? – Arya McCarthy May 27 '18 at 21:13