Bottleneck extrema

Jack Edmonds , D.R. Fulkerson
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引用次数: 0

Abstract

Let E be a finite set. Call a family of mutually noncomparable subsets of E a clutter on E. It is shown that for any clutter on E, there exists a unique clutter on E such that, for any function f from E to real numbers,

minmaxf(x)=RxRmaxminf(x)SxS

Specifically, consists of the minimal subsets of E that have non-empty intersection with every member of . The pair (,) is called a blocking system on E. An algorithm is described and several examples of blockings systems are discussed.

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瓶颈极值
设E是一个有限集合。将E上的一组相互不可比较的子集称为E上的杂波。证明了对于E上的任意杂波∑,存在一个唯一的杂波∑E,使得对于从E到实数的任意函数f,min (max)∑f(x)=R∈∂x∈Rmax∈∂f(x)S∈∂x∈∂S,其中,∑由E的最小子集组成,且该最小子集与∈的每一个元素都有非空交。本文描述了e上的一个阻塞系统的算法,并讨论了阻塞系统的几个例子。
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