A.D. Alexandrov's problem for Busemann non-positively curved spaces

Details A.D. Alexandrov's problem for Busemann non-positively curved spaces A.D. Alexandrov's problem for Busemann non-positively curved spaces

2008-05-11

arxiv.org/abs/0805.1539v1

Mathematics

Metric Geometry

Scientific paper

The paper is the last in the cycle devoted to the solution of Alexandrov's problem for non-positively curved spaces. Here we study non-positively curved spaces in the sense of Busemann. We prove that if $X$ is geodesically complete connected at infinity proper Busemann space, then it has the following characterization of isometries. For any bijection $f:X\to X$, if $f$ and $f^{-1}$ preserve the distance 1, then $f$ is an isometry.

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