Gromov--Hausdorff Distance for Directed Spaces

Lisbeth Fajstrup, Brittany Terese Fasy, Wenwen Li, Lydia Mezrag, Tatum Rask, Francesca Tombari, Živa Urbančič
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Abstract

The Gromov--Hausdorff distance measures the similarity between two metric spaces by isometrically embedding them into an ambient metric space. In this work, we introduce an analogue of this distance for metric spaces endowed with directed structures. The directed Gromov--Hausdorff distance measures the distance between two new (extended) metric spaces, where the new metric, on the same underlying space, is induced from the length of the zigzag paths. This distance is then computed by isometrically embedding the directed spaces, endowed with the zigzag metric, into an ambient directed space with respect to such zigzag distance. Analogously to the standard Gromov--Hausdorff distance, we propose alternative definitions based on the distortion of d-maps and d-correspondences. Unlike the classical case, these directed distances are not equivalent.
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有向空间的格罗莫夫--豪斯多夫距离
格罗莫夫--豪斯多夫距离通过将两个度量空间等距嵌入一个环境度量空间来度量它们之间的相似性。在本研究中,我们为有向结构的度量空间引入了类似的距离。有向格罗莫夫--豪斯多夫距离测量两个新(扩展)度量空间之间的距离,其中相同底层空间上的新度量是由之字形路径的长度诱导出来的。然后,通过将赋予人字形度量的有向空间等距嵌入到环境有向空间中,就可以计算出这种人字形距离。与标准的格罗莫夫--豪斯多夫距离类似,我们提出了基于 d 映射和 d 对应关系变形的替代定义。与经典的情况不同,这些有向距离是等价的。
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