Hyperbolic and euclidean distance functions

Authors

  • Walter Benz

Keywords:

hyperbolic distance, invariance of distance functions under special motions

Abstract

This is a functional equations approach to the non-negative functions $h(x,y)$ and $e(x,y)$ as defined in formulas (1) and (2). Moreover, all distance functions of $\mathbb{R}_{n}$ are characterized, which are invariant under linear and orthogonal mappings (see Theorem 1), and, especially, all functions of this type are determined, which satisfy in addition ($D_{2}$) (see Theorem 2). Here ($D_{2}$) asks for the invariance under euclidean or hyperbolic translations of the $x_{1}$-axis. Finally, additivity on the $x_{1}$-axis is considered, leading to the distance functions $h$ and $e$ up to non-negative factors (see Theorem 3).

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Published

1997-12-12

How to Cite

Benz, W. (1997). Hyperbolic and euclidean distance functions. Ann. Sofia Univ. Fac. Math. And Inf., 89, 59–67. Retrieved from https://stipendii.uni-sofia.bg/index.php/fmi/article/view/355