Mean convex properly embedded [,e3]-minimal surfaces in R3

Abstract

We establish curvature estimates and a convexity result for mean convex properly embedded [,e3]-minimal surfaces in R3, i.e., -minimal surfaces when depends only on the third coordinate of R3. Led by the works on curvature estimates for surfaces in 3-manifolds, due to White for minimal surfaces, to Rosenberg, Souam and Toubiana, for stable CMC surfaces, and to Spruck and Xiao for stable translating solitons in R3, we use a compactness argument to provide curvature estimates for a family of mean convex [,e3]-minimal surfaces in R3. We apply this result to generalize the convexity property of Spruck and Xiao for translating solitons. More precisely, we characterize the convexity of a properly embedded [,e3]-minimal surface in R3 with non positive mean curvature when the growth at infinity of is at most quadratic.