Mathematics Stack Exchange is a question and answer site for people studying math at any level and professionals in related fields. It's 100% free, no registration required.

Sign up
Here's how it works:
  1. Anybody can ask a question
  2. Anybody can answer
  3. The best answers are voted up and rise to the top

This is a question about complex networks

We have various ways to measure the centrality or importance of a node.

$$\textrm{importance} :: \textrm{node} \rightarrow \mathbb{R}$$

The simplest such measure is the degree of the node.

There are some more advanced measures of centrality like eigenvector/katz/alpha centrality, pagerank, betweenness, etc.... These can find important nodes (in some sense) even when they have low degree.

We can also ask about the connection between two nodes

$$\textrm{connection} :: (\textrm{node}, \textrm{node}) \rightarrow \mathbb{R}$$

What measures do we have here? The analog to degree, the simplest importance measure, would be the weight of the edge between the two nodes (if any). Are there analogs of the other various centrality measures?

Question: What are known ways of computing the connection between two nodes?

Note - I am particularly interested in concepts which scale to very large graphs

share|cite|improve this question
Distance between the nodes and vertex/edge-connectivity ('s_theorem) immediately comes to mind. – utdiscant Jul 7 '12 at 1:45

Given a graph $G$, you can make a graph $H$ where the vertices of $H$ are the edges of $G$, and two vertices in $H$ are joined by an edge if and only if the corresponding edges in $G$ meet at a vertex of $G$. Then you can apply your favorite measure of centrality to vertices of $H$, and you'll actually be applying it to edges in $G$.

I don't know how good a measure of centrality you get this way, but I would think it would be worth a look.

share|cite|improve this answer

You are probably looking for something like the minimum number of edges (or vertices) that have to be removed from $G$ to destroy every path between two prescribed vertices $u$ and $v$.

For this purpose, running a max-flow algorithm suffices (see Max-flow min-cut theorem) for the edges version, but the same algorithm can be used to solve the problem for vertices, with a simple modification of the input graph.

share|cite|improve this answer

There are a number of ways in which you can measure the connection between two nodes. Here are few:

  1. As you mentioned, the weight of the edge if there is any otherwise 0 (which can be thought of as the least value of the connection).
  2. Hitting time or Commute time (based on random walks).
  3. Personalized Pagerank.
  4. Shortest path length (or geodesic distance).

There are many more I guess. The method that you might want to use depends on what you're trying to do with that. Hope it helps.

share|cite|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.