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Constructive bounds and exact expectations for the random assignment problem

โœ Scribed by Don Coppersmith; Gregory B. Sorkin

Publisher
John Wiley and Sons
Year
1999
Tongue
English
Weight
346 KB
Volume
15
Category
Article
ISSN
1042-9832

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โœฆ Synopsis

The random assignment problem is to choose a minimum-cost perfect matching in a complete n = n bipartite graph, whose edge weights are chosen randomly from some distribution such as the exponential distribution with mean 1. In this case it is known that the expectation does not grow unboundedly with n, but approaches some limiting value c* between 1.51 and 2. The limit is conjectured to be 2 r6, while a recent conjecture is that for finite n, the expected cost is ร n 1ri 2 . This paper contains two principal results. First, is1 by defining and analyzing a constructive algorithm, we show that the limiting expectation is c* -1.94. Second, we extend the finite-n conjecture to partial assignments on complete m = n bipartite graphs and prove it in some limited cases.

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โœ Wansoo T. Rhee ๐Ÿ“‚ Article ๐Ÿ“… 1999 ๐Ÿ› John Wiley and Sons ๐ŸŒ English โš– 120 KB

In this problem, we are given N uniformly distributed random intervals of 0 1 . For each random interval I, we are given a weight X I . These weights are independent, independent of the intervals, and satisfy P X I โ‰ค t = t ฮฑ , where ฮฑ > 0. A packing of the family is a disjoint subfamily of intervals