Abstract
In this paper, we present iterative methods for finding optimal state-dependent routing strategies in single commodity networks. The key to our method is to show that there exists a family of optimization problems with convex cost and linear constraints that have solutions that can be converted into an optimal routing strategy by way of a flow relaxation transformation. These problems, when solved by certain iterative algorithms, lead to different convergence rates. In particular, one of the problems has quadratic cost. To solve one of these optimization problems, we use an iterative projected descent direction algorithm due to Bertsekas. We present an alternative to the Armijo-like step size rule of the algorithm, which we believe is more robust. Also included are Newton-like descent directions that take a reasonable amount of time to compute. Finally, some results of our computer experiments are summarized.
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