非分支简单复数上持久拉普拉奇的快速算法

Rui Dong
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引用次数: 0

摘要

在本文中,我们提出了一种算法,用于计算在一对无分支且方向可兼容的复数 $K\hookrightarrow L$ 上的向上持久性拉普拉奇的矩阵表示 $/三角形_{q, \mathrm{up}}^{K, L}$,该算法具有二次时间复杂性。此外,我们还证明了矩阵表示 $\Delta_{q, \mathrm{up}}^{K,L}$ 可以被识别为加权定向超图的拉普拉奇,这可以被视为克朗还原的高维广义化。最后,我们引入了一个关于 $\Delta_{q, \mathrm{up}}^{K, L}$ 的最小特征值 $\lambda_{mathbf{min}}^{K, L}$ 的切格型不等式。
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A faster algorithm of up persistent Laplacian over non-branching simplicial complexes
In this paper we present an algorithm for computing the matrix representation $\Delta_{q, \mathrm{up}}^{K, L}$ of the up persistent Laplacian $\triangle_{q, \mathrm{up}}^{K, L}$ over a pair of non-branching and orientation-compatible simplicial complexes $K\hookrightarrow L$, which has quadratic time complexity. Moreover, we show that the matrix representation $\Delta_{q, \mathrm{up}}^{K, L}$ can be identified as the Laplacian of a weighted oriented hypergraph, which can be regarded as a higher dimensional generalization of the Kron reduction. Finally, we introduce a Cheeger-type inequality with respect to the minimal eigenvalue $\lambda_{\mathbf{min}}^{K, L}$ of $\Delta_{q, \mathrm{up}}^{K, L}$.
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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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