Rotational linear Weingarten surfaces of hyperbolic type
Abstract
A linear Weingarten surface in Euclidean space R3 is a surface whose mean curvature H and Gaussian curvature K satisfy a relation of the form aH+bK=c, where a,b,c∈ R. Such a surface is said to be hyperbolic when a2+4bc<0. In this paper we classify all rotational linear Weingarten surfaces of hyperbolic type. As a consequence, we obtain a family of complete hyperbolic linear Weingarten surfaces in R3 that consists into periodic surfaces with self-intersections.
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