Separable surfaces that are critical points of the Dirichlet energy

Abstract

In this paper, we study surfaces z=φ(x,y) in Euclidean space that satisfy the equation φxx+φyy=Λ2 where Λ∈ is a real constant. We classify these surfaces when they are the zero level sets of an implicit equation of the type f(x)+g(y)+h(z)=0, where f, g and h are smooth functions of one variable. If Λ=0, we find a large family of surfaces with interesting symmetry properties. However, if Λ=0, we show that the surfaces must be either surfaces of revolution or of the type z=f(x)+g(y); furthermore, explicit parametrizations of these surfaces are obtained.