Rotational hypersurfaces family satisfying Ln-3G=AG in En

Abstract

In this paper, we investigate rotational hypersurfaces family in n -dimensional Euclidean space En. Our focus is on studying the Gauss map G of this family with respect to the operator Lk, which acts on functions defined on the hypersurfaces. The operator Lk can be viewed as a modified Laplacian and is known by various names, including the Cheng--Yau operator in certain cases. Specifically, we focus on the scenario where k=n-3 and n≥ 3. By applying the operator Ln-3 to the Gauss map G, we establish a classification theorem. This theorem establishes a connection between the n× n matrix A, and the Gauss map G through the equation Ln-3G=AG.