Surfaces of prescribed linear Weingarten curvature in R3

Abstract

Given a,b∈R and ∈ C1(S2), we study immersed oriented surfaces in the Euclidean 3-space R3 whose mean curvature H and Gauss curvature K satisfy 2aH+bK=(N), where N:→S2 is the Gauss map. This theory widely generalize some of paramount importance such as the ones constant mean and Gauss curvature surfaces, linear Weingarten surfaces and self-translating solitons of the mean curvature flow. Under mild assumptions on the prescribed function , we exhibit a classification result for rotational surfaces in the case that the underlying fully nonlinear PDE that governs these surfaces is elliptic or hyperbolic.