Elliptic logarithms, diophantine approximation and the Birch and Swinnerton-Dyer conjecture

Abstract. A generalized constant ratio surface (GCR surface) is defined by the property that the tangential component of the position vector is a principal direction at each point on the surface, see [8] for details. In this paper, by solving some differential equations, a complete classification of Lorentz GCR surfaces in the three-dimensional Minkowski space is presented. Moreover, it turns out that a flat Lorentz GCR surface is an open part of a cylinder, apart from a plane and a CMC Lorentz GCR surface is a surface of revolution.

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Elliptic logarithms, diophantine approximation and the Birch and Swinnerton-Dyer conjecture

Cited by 2 publications

References 34 publications

Geometry of spacelike generalized constant ratio surfaces in Minkowski 3-space

Geometry of spacelike generalized constant ratio surfaces in Minkowski 3-space

On Lorentz GCR Surfaces in Minkowski 3-Space

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