M. Dede, C. Ekici, W. Goemans, “Surfaces of revolution with vanishing curvature in Galilean 3-space”, Zh. Mat. Fiz. Anal. Geom., 2018, Volume 14, Number 2,Pages <nobr>141

This article is cited in 9 papers

Surfaces of revolution with vanishing curvature in Galilean 3-space

M. Dede^a, C. Ekici^b, W. Goemans^c

^a Kilis 7 Aralık University, Department of Mathematics, Kilis, 79000, Turkey
^b Eskişehir Osmangazi University, Department of Mathematics-Computer, Eskişehir, 26480, Turkey
^c KU Leuven, Faculty of Economics and Business, Brussels, 1000, Belgium

Abstract: In the paper, three types of surfaces of revolution in the Galilean 3-space are defined and studied. The construction of the well-known surface of revolution, defined as the trace of a planar curve rotated about an axis in the supporting plane of the curve, is given for the Galilean 3-space. Then we classify the surfaces of revolution with vanishing Gaussian curvature or vanishing mean curvature in the Galilean 3-space.

Key words and phrases: surface of revolution, flat surface, minimal surface, Galilean 3-space.

MSC: 53A10, 53A35, 53A40

Received: 09.01.2017
Revised: 20.06.2017

Language: English

DOI: 10.15407/mag14.02.141