Classes of Weingarten Surfaces in S2xR

Abstract

In this work we study surfaces in radial conformally flat spaces. We characterize surfaces of rotation with constant Gaussian and Extrinsic curvature in these radial 3-spaces. We prove that all the spheres in the conformal 3-space have constant Gaussian curvature K=1 if, and only if, the conformal factor is special. In this special case we study geometric properties of this ambient 3-space, and as an application we prove that it is isometric to the space S2× R, so we consider it as the Radial Model of S2× R. We obtain two classes of Weingarten surfaces in the Radial Model, which satisfy KE+H2-K=0 and 2KE-K=0 , where K is the Gaussian curvature, H is the mean curvature and KE is the extrinsic curvature. Moreover, by using the relations between the curvatures of the Radial Model and the curvatures with respect to the euclidean metric ([CPS]), we prove that first class the Weingarten surfaces in Radial Model corresponds, up to isometries, to the minimal surfaces in R3, and second class corresponds to EDSGHW - surfaces in Euclidean space R 3(DC). Consequently these two classes of surfaces have a Weierstrass type representation depending on two holomorphic functions.