Dual coordinate step methods for linear network flow problems

Abstract: We review a class of recently-proposed linear-cost network flow methods which are amenable to distributed implementation. All the methods in the class use the notion of e-complementary slackness, and most do not explicitly manipulate any "global" objects such as paths, trees, or cuts. Interestingly, these methods have stimulated a large number of new serial computational complexity results. We develop the basic theory of these methods and present two specific methods, the e-relaxation algorithm for the minimum… Show more

“…For integer data, it can be shown that the worst-case running time of the auction algorithm using scaling and appropriate data structures is O nA log(nC) ; see [BeE88], [BeT89]. Based on experiments, the running time of the algorithm for randomly generated problems seems to grow proportionally to something like A log n or A log n log(nC).…”

“…The complexity of the scaled version was first studied in [Gol87], where particularly favorable polynomial running time estimates were derived; see [BeE87], [BeE88], [GoT90] for additional results along these lines.…”

“…Computational studies [BCT91], [BeE88] have shown that it is often substantially faster than its closest competitors, particularly for sparse problems. The speedup factor typically increases with the problem size.…”

“…However, the -relaxation method is well suited for parallel computation, so in some parallel computing environments it may be faster than its closest competitors. The method admits a totally asynchronous implementation, as shown in the original paper [Ber86a]; see also [BeE88], [BeT89].…”

“…This algorithm was further developed in [Ber85], [Ber88], and [BeE88]. The motivation was to solve the problem by using parallelism in a natural way.…”

Auction algorithms for network flow problems: A tutorial introduction

“…For integer data, it can be shown that the worst-case running time of the auction algorithm using scaling and appropriate data structures is O nA log(nC) ; see [BeE88], [BeT89]. Based on experiments, the running time of the algorithm for randomly generated problems seems to grow proportionally to something like A log n or A log n log(nC).…”

“…The complexity of the scaled version was first studied in [Gol87], where particularly favorable polynomial running time estimates were derived; see [BeE87], [BeE88], [GoT90] for additional results along these lines.…”

“…Computational studies [BCT91], [BeE88] have shown that it is often substantially faster than its closest competitors, particularly for sparse problems. The speedup factor typically increases with the problem size.…”

“…However, the -relaxation method is well suited for parallel computation, so in some parallel computing environments it may be faster than its closest competitors. The method admits a totally asynchronous implementation, as shown in the original paper [Ber86a]; see also [BeE88], [BeT89].…”

“…This algorithm was further developed in [Ber85], [Ber88], and [BeE88]. The motivation was to solve the problem by using parallelism in a natural way.…”

Auction algorithms for network flow problems: A tutorial introduction

The Auction Algorithm for Assignment and Other Network Flow Problems

Parallel Algorithms for Network Problems