An extension (V, d) of a metric space (S, μ) is a metric space with S Í V{{S subseteq V}} and d | S = m{{dmid{_S} = mu}} , and is said to be tight if there is no other extension (V, d′) of (S, μ) with d′ ≤ d . Isbell and Dress independently found that every tight extension embeds isometrically into a certain metrized polyhedral complex associated with (S, μ), called the tight span. This paper develops an analogous theory for directed metrics, which are “not necessarily symmetric” distance functions satisfying the triangle inequality. We introduce a directed version of the tight span and show that it has a universal embedding property for tight extensions. Also we introduce a new natural class of extensions, called cyclically tight extensions, and we show that there also exists a certain polyhedral complex having a universal property relative to cyclically tightness. This polyhedral complex coincides with (a fiber of) the tropical polytope spanned by the column vectors of –μ, which was earlier introduced by Develin and Sturmfels. Thus this gives a tight-span interpretation to the tropical polytope generated by a nonnegative square matrix satisfying the triangle inequality. As an application, we prove the following directed version of the tree metric theorem: A directed metric μ is a directed tree metric if and only if the tropical rank of –μ is at most two. Also we describe how tight spans and tropical polytopes are applied to the study of multicommodity flows in directed networks.
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机译:度量空间(S,μ)的扩展(V,d)是具有SÍV {{Ssubseteq V}}和d |的度量空间。 S = m {{dmid {_S} = mu}},并且如果没有(d)≤d的(S,μ)的其他扩展(V,d'),则说是紧密的。 Isbell和Dress分别发现,每个紧密延伸等距地等距嵌入与(S,μ)相关联的某个金属化多面体复合物中,称为紧密跨度。本文针对有向度量开发了一种类似的理论,即满足三角形不等式的“不一定对称”距离函数。我们介绍了紧密跨度的有向版本,并表明它具有用于紧密扩展的通用嵌入属性。另外,我们引入了一种新的自然扩展名,称为循环紧密扩展,并且我们还表明,还存在某种具有相对于循环紧密性具有通用属性的多面体复合体。这种多面体复合体与由–μ列向量跨越的热带多面体(的一种纤维)重合,后者是Develin和Sturmfels较早引入的。因此,这对由满足三角形不等式的非负方阵生成的热带多面体给出了跨度的解释。作为应用,我们证明了树度量定理的以下有向形式:当且仅当–μ的热带等级最多为2时,有向度量μ才是有向树度量。此外,我们还将描述跨度和热带多面体如何应用于有向网络中的多商品流研究。
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