Published on *Computer Science Department at Princeton University* (http://www.cs.princeton.edu)

The classical maximum flow problem sometimes occurs in settings in which the arc capacities are not fixed but are functions of a single parameter, and the goal is to find the value of the parameter such that the corresponding maximum flow or minimum cut satisfies some side condition. Finding the desired

parameter value requires solving a sequence of related maximum flow problems. We show that the recent maximum flow algorithm of Goldberg and Tarjan can be extended to solve an important class of such parametric maximum flow problems, at the cost of only a constant factor in its worst case time bound. Faster algorithms for a variety of combinatorial optimization problems follow from our result.