Curvature estimates for surfaces with bounded mean curvature

Abstract

Estimates for the norm of the second fundamental form, |A|, play a crucial role in studying the geometry of surfaces. In fact, when |A| is bounded the surface cannot bend too sharply. In this paper we prove that for an embedded geodesic disk with bounded L2 norm of |A|, |A| is bounded at interior points, provided that the W1,p norm of its mean curvature is sufficiently small, p>2. In doing this we generalize some renowned estimates on |A| for minimal surfaces.