What is the time complexity of computing betweenness centrality if we are given the shortest path predecessor matrix of a graph?

Predecessor matrix cells look like this:

- if node
*i*and node*j*are directly connected then value in the cell is 0; - if node
*i*and node*j*are not connected then value in the cell is -1; - else cell = predecessor(
*j*) - this can be only one predecessor if there is a single shortest path or an array of predecessors if there are more than one shortest paths between*i*and*j*.

Thank you for your answer,

I am familiar with Brandes Algorithm. However Brandes Algorithm will compute the betweenness for all the nodes inside a network. I think that time spent for computing CB for one vertex is the same as the time for computing CB for all vertices as Brandes algorithm can't be adapted for such a case.

So, my idea was to store the predecessor matrix, and to be able to compute CB for a certain vertex (and not have to wait for all vertices CB computations). I am aware I can't achieve smaller time complexity but I think that the difference in amount of time can be made by not computing CB for all 7000 vertices. Instead, by having this matrix I am able to compute CB for only one single vertex.

I think it is possible to compute CB in O(n^2*L) where L is the average shortest path when we have predecessor matrix.

What is your opinion about this concept?