Parabolic Weingarten surfaces in hyperbolic space

Abstract

A surface in hyperbolic space 3 invariant by a group of parabolic isometries is called a parabolic surface. In this paper we investigate parabolic surfaces of 3 that satisfy a linear Weingarten relation of the form a1+b2=c or aH+bK=c, where a,b,c∈ and, as usual, i are the principal curvatures, H is the mean curvature and K is de Gaussian curvature. We classify all parabolic linear Weingarten surfaces in hyperbolic space.