Mannheim Curves in the three-dimensional Sphere

Abstract

Mannheim curves are defined for immersed curves in 3-dimensional sphere S3 . The definition is given by considering the geodesics of S3. First, two special geodesics, called principal normal geodesic and binormal geodesic, of S3 are defined by using Frenet vectors of a curve immersed in S3. Later, the curve alpha is called a Mannheim curve if there exits another curve beta in S3 such that the principal normal geodesics of beta coincide with the binormal geodesics of S3 . It is obtained that if alpha and beta form a Mannheim pair then there exist a constant lambda that is not equal 0 and a non-constant function Mu such that Lambda.(kappaalpha)+M(Taualpha)=1 where kappaalpha, Taualpha are the curvatures of alpha. Moreover, the relation between a Mannheim curve immersed in S3 and a generalized Mannheim curve in E4 is obtained and a table containing comparison of Bertrand and Mannheim curves in S3 is introduced.