Estimates for the Constant Mean Curvature Dirichlet Problem on Catenoids

Abstract

In this article, we solve the constant mean curvature dirichlet problem on catenoidal necks with small scale in R3. The solutions are found in exponentially weighted H\"older spaces with non-integer weight and are a-priori bounded by a uniform constant times r1 + γ, where r denotes the distance to the axis of the neck and where γ belongs to the interval (0, 1). By comparing the solutions with their limits on the disk, we improve the estimate to γ =1. As a corollary, we prove differentiability of solutions in τ down to τ = 0. The surfaces we construct have applications to gluing constructions.