On Minimal Surfaces of Revolutions Immersed in Deformed Hyperbolic Kropina Space

Abstract

In this paper we consider three dimensional upper half space H3 equipped with various Kropina metrics obtained by deformation of hyperbolic metric of H3 through 1-forms and obtain a partial differential equation that characterizes minimal surfaces immersed in it. We prove that such minimal surfaces can only be obtained when the hyperbolic metric is deformed along x3 direction. Then we classify such minimal surfaces and show that flag curvature of these surfaces is always non-positive. We also obtain the geodesics of this surface. In particular, it follows that such surfaces neither have forward conjugate points nor they are forward complete.