Turkish Journal of Mathematics
Abstract
The general rotational surfaces in the Euclidean 4-space $\mathbb{R}^{4}$ was first studied by Moore (1919). The Vranceanu surfaces are the special examples of these kind of surfaces. Self-shrinker flows arise as special solution of the mean curvature flow that preserves the shape of the evolving submanifold. In addition, $\xi -$surfaces are the generalization of self-shrinker surfaces. In the present article we consider $\xi -$surfaces in Euclidean spaces. We obtained some results related with rotational surfaces in Euclidean $4-$space $\mathbb{R}^{4}$ to become self-shrinkers. Furthermore, we classify the general rotational $\xi -$surfaces with constant mean curvature. As an application, we give some examples of self-shrinkers and rotational $\xi -$surfaces in $\mathbb{R}^{4}$.
DOI
10.3906/mat-2006-93
Keywords
Mean curvature, self-shrinker, general rotational surface
First Page
1287
Last Page
1299
Recommended Citation
ARSLAN, K, AYDIN, Y, & BULCA, B (2021). General rotational $\xi -$surfaces in Euclidean spaces. Turkish Journal of Mathematics 45 (3): 1287-1299. https://doi.org/10.3906/mat-2006-93
