Pan-American Journal of Mathematics

In this study, we first establish several formulae according to the first and second Beltrami operators. We discuss the class of surfaces of revolution in the 3-dimensional Euclidean space E³ without parabolic points, in which the position vector X satisfies ∆^IIX = DX, with ∆^II is the Laplace operator of the metric II of the surface and D is a square matrix of order 3. We prove that surfaces satisfying the preceding relation are either part of a sphere or catenoid.

Pan-Amer. J. Math. 3 (2024), 23

This article was published on December 23, 2024 by Mathyze, under a Creative Commons Attribution 4.0 International License.