Embeddings and near-neighbor searching with constant additive error for hyperbolic spaces

Eunku Park, Antoine Vigneron
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Abstract

We give an embedding of the Poincar\'e halfspace $H^D$ into a discrete metric space based on a binary tiling of $H^D$, with additive distortion $O(\log D)$. It yields the following results. We show that any subset $P$ of $n$ points in $H^D$ can be embedded into a graph-metric with $2^{O(D)}n$ vertices and edges, and with additive distortion $O(\log D)$. We also show how to construct, for any $k$, an $O(k\log D)$-purely additive spanner of $P$ with $2^{O(D)}n$ Steiner vertices and $2^{O(D)}n \cdot \lambda_k(n)$ edges, where $\lambda_k(n)$ is the $k$th-row inverse Ackermann function. Finally, we present a data structure for approximate near-neighbor searching in $H^D$, with construction time $2^{O(D)}n\log n$, query time $2^{O(D)}\log n$ and additive error $O(\log D)$. These constructions can be done in $2^{O(D)}n \log n$ time.
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双曲空间的嵌入和近邻搜索与恒定加性误差
我们基于$H^D$的二元平铺给出了将Poincar\'e半空间$H^D$嵌入离散度量空间的方法,其附加变形为$O(\log D)$。我们证明了在$H^D$中$n$点的任何子集$P$都可以嵌入到一个具有$2^{O(D)}n$顶点和边的图度量中,并且具有加性失真$O(\log D)$。我们还展示了如何为任意 $k$ 构建一个 $O(k\log D)$ 的 $P$ 纯加法跨度,该跨度具有 $2^{O(D)}n$ 斯泰纳顶点和 $2^{O(D)}n \cdot \lambda_k(n)$ 边,其中 $\lambda_k(n)$ 是 $k$ 第四行反阿克曼函数。最后,我们提出了一种在 $H^D$ 中进行近似近邻搜索的数据结构,其构造时间为 $2^{O(D)}n\log n$,查询时间为 $2^{O(D)}\log n$,加法误差为 $O(\logD)$。这些构造可以在 2^{O(D)}n \log n$ 时间内完成。
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