Your search keyword '"Savas-Halilaj, Andreas"' showing total 2 results

1. Sharp pinching theorems for complete submanifolds in the sphere.

Author

Magliaro, Marco, Mari, Luciano, Roing, Fernanda, and Savas-Halilaj, Andreas

Subjects

TORUS, GEODESICS, CURVATURE, SPHERES, HYPERSURFACES, SUBMANIFOLDS

Abstract

For every complete and minimally immersed submanifold f : M n → S n + p whose second fundamental form satisfies | A | 2 ≤ n ⁢ p / (2 ⁢ p − 1) , we prove that it is either totally geodesic, or (a covering of) a Clifford torus or a Veronese surface in S 4 , thereby extending the well-known results by Simons, Lawson and Chern, do Carmo & Kobayashi from compact to complete M n . We also obtain the corresponding result for complete hypersurfaces with non-vanishing constant mean curvature, due to Alencar & do Carmo in the compact case, under the optimal bound on the umbilicity tensor. In dimension n ≤ 6 , a pinching theorem for complete higher-codimensional submanifolds with non-vanishing parallel mean curvature is proved, partly generalizing previous work by Santos. Our approach is inspired by the conformal method of Fischer-Colbrie, Shen & Ye and Catino, Mastrolia & Roncoroni. [ABSTRACT FROM AUTHOR]

Published

2024

2. A characterization of the grim reaper cylinder.

Author

Martín, Francisco, Pérez-García, Jesús, Savas-Halilaj, Andreas, and Smoczyk, Knut

Subjects

SOLITONS, CYLINDER (Shapes), NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICAL models

Abstract

In this article we prove that a connected and properly embedded translating soliton in ℝ 3 {{\mathbb{R}^{3}}} with uniformly bounded genus on compact sets which is C 1 {C^{1}} -asymptotic to two planes outside a cylinder, either is flat or coincide with the grim reaper cylinder. [ABSTRACT FROM AUTHOR]

Published

2019