Minimal projective resolution and magnitude homology of geodetic metric spaces

Yasuhiko Asao, Shun Wakatsuki
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Abstract

Asao-Ivanov showed that magnitude homology is a Tor functor, hence we can compute it by giving a projective resolution of a certain module. In this article, we compute magnitude homology by constructing a minimal projective resolution. As a consequence, we determine magnitude homology of geodetic metric spaces. We show that it is a free $\mathbb Z$-module, and give a recursive algorithm for constructing all cycles. As a corollary, we show that a finite geodetic metric space is diagonal if and only if it contains no 4-cuts. Moreover, we give explicit computations for cycle graphs, Petersen graph, Hoffman-Singleton graph, and a missing Moore graph. It includes another approach to the computation for cycle graphs, which has been studied by Hepworth--Willerton and Gu.
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大地测量度量空间的最小投影分辨率和量级同源性
阿绍-伊万诺夫(Asao-Ivanov)证明了幅同调是一个 Tor 函数,因此我们可以通过给出某个模块的投影解析来计算幅同调。在本文中,我们通过构造最小投影解析来计算幅同调。因此,我们确定了大地测量空间的幅同调。我们证明了它是一个自由的 $\mathbb Z$ 模块,并给出了构造所有循环的递归算法。此外,我们还给出了循环图、彼得森图、霍夫曼-辛格尔顿图和缺失摩尔图的显式计算。此外,我们还给出了循环图、彼得森图、霍夫曼-辛格尔顿图和缺失摩尔图的明确计算方法。
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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Tensor triangular geometry of modules over the mod 2 Steenrod algebra Ring operads and symmetric bimonoidal categories Inferring hyperuniformity from local structures via persistent homology Computing the homology of universal covers via effective homology and discrete vector fields Geometric representation of cohomology classes for the Lie groups Spin(7) and Spin(8)
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