单位球中的希尔伯特公制

Pub Date : 2023-10-24 DOI:10.1556/012.2023.01544

Oona Rainio, Matti Vuorinen

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引用次数: 1

摘要

有界凸域𝐺中两点间的希尔伯特度规定义为相交比的对数，以及经过点的欧几里得线与域边界的相交点的对数。在这里，我们研究了单位球𝑛的情况下的度量。我们给出了希尔伯特度规和双曲度规之间的恒等式，给出了希尔伯特度规的几个不等式，以及与希尔伯特度规中定义的球的包含性质有关的结果。进一步研究了希尔伯特度规在保角和拟正则映射下的畸变。

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Hilbert Metric in the Unit Ball

The Hilbert metric between two points 𝑥, 𝑦 in a bounded convex domain 𝐺 is defined as the logarithm of the cross-ratio 𝑥, 𝑦 and the intersection points of the Euclidean line passing through the points 𝑥, 𝑦 and the boundary of the domain. Here, we study this metric in the case of the unit ball 𝔹 𝑛 . We present an identity between the Hilbert metric and the hyperbolic metric, give several inequalities for the Hilbert metric, and results related to the inclusion properties of the balls defined in the Hilbert metric. Furthermore, we study the distortion of the Hilbert metric under conformal and quasiregular mappings.

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