I have a weighted graph with (in practice) up to 50,000 vertices. Given a vertex, I want to randomly choose an adjacent vertex based on the relative weights of all adjacent edges.

How should I store this graph in memory so that making the selection is efficient? What is the best algorithm? It could be as simple as a key value store for each vertex, but that might not lend itself to the most efficient algorithm. I'll also need to be able update the network.

Note that I'd like to take only one "step" at a time.

**More Formally**: Given a weighted, directed, and potentially complete graph, let *W(a,b)* be the weight of edge a->b and let *W _{a}* be the sum of all edges from

*a*. Given an input vertex

*v*, I want to choose a vertex randomly where the likelihood of choosing vertex

*x*is

*W(v,x)*/

*W*

_{v}**Example**:

Say *W(v,a)* = 2, *W(v,b)* = 1, *W(v,c)* = 1.

Given input *v*, the function should return *a* with probability 0.5 and *b* or *c* with probability 0.25.