There are two common generalisations that I know of to add weights.

## Min cost flow

Suppose you had a weight for each edge and wanted to compute the flow that satisfied the constraints and had minimum cost. (Cost = sum of weight * units flowing along associated edge)

This problem is called minimum cost flow.

An implementation can be found in networkx called min-cost-flow.

Here is a good topcoder tutorial on a primal-dual approach.

My favorite algorithm for this was actually invented by Fulkerson himself in 1961 and is called the out of kilter algorithm.

## Max flow min cost

Suppose you definitely wanted the maximum flow, but wanted to choose the flow with least weight.

This differs from the first interpretation, in that a min-cost-flow may not give the maximum possible flow. For example, suppose we have a single edge start->end with the constraint that the flow is in the range 0 to 1, and a weight of 1.

The min-cost-flow will be a flow of 0, while the max-flow-min-cost will have a flow of 1.

An implementation for this can be found in networkx called max_flow_min_cost.