Stochastic Bounds for the Max Flow in a Network with Discrete Random Capacities

Q3 Computer Science

Electronic Notes in Theoretical Computer Science Pub Date : 2020-11-01 DOI:10.1016/j.entcs.2020.10.014

L. Echabbi , J.M. Fourneau , O. Gacem , H. Lotfi , N. Pekergin

引用次数: 1

Abstract

We show how to obtain stochastic bounds for the strong stochastic ordering and the concave ordering of the maximal flow in a network where the capacities are non negative discrete random variables. While the deterministic problem is polynomial, the stochastic version with discrete random variables is NP-hard. The monotonicity of the Min-Cut problem for these stochastic orderings allows us to simplify the input distributions and obtain bounds on the results. Thus we obtain a tradeoff between the complexity of the computations and the precision of the bounds. We illustrate the approach with some examples.

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离散随机容量网络中最大流量的随机边界

给出了容量为非负离散随机变量的网络中最大流的强随机有序和凹有序的随机界。确定性问题是多项式问题，而具有离散随机变量的随机问题是np困难问题。这些随机排序的最小割问题的单调性使我们能够简化输入分布并获得结果的界。因此，我们在计算的复杂性和边界的精度之间进行了权衡。我们用一些例子来说明这种方法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Electronic Notes in Theoretical Computer Science Computer Science-Computer Science (all)

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