Geodesics on Regular Constant Distance Surfaces
Abstract
Suppose that the surfaces K0 and Kr are the boundaries of two convex, complete, connected C^2 bodies in R^3. Assume further that the (Euclidean) distance between any point x in Kr and K0 is always r (r > 0). For x in Kr, let {\Pi}(x) denote the nearest point to x in K0. We show that the projection {\Pi} preserves geodesics in these surfaces if and only if both surfaces are concentric spheres or co-axial round cylinders. This is optimal in the sense that the main step to establish this result is false for C^{1,1} surfaces. Finally, we give a non-trivial example of a geodesic preserving projection of two C^2 non-constant distance surfaces. The question whether for any C^2 convex surface S0, there is a surface S whose projection to S0 preserves geodesics is open.
Cite
@article{arxiv.2309.05808,
title = {Geodesics on Regular Constant Distance Surfaces},
author = {J. J. P. Veerman},
journal= {arXiv preprint arXiv:2309.05808},
year = {2023}
}
Comments
9 figures, 15 pages