Stochastic half-space theorems for minimal surfaces and H-surfaces of R3

Abstract

We prove a version of the strong half-space theorem between the classes of recurrent minimal surfaces and complete minimal surfaces with bounded curvature of R3. We also show that any minimal hypersurface immersed with bounded curvature in M× + equals some M× \s\ provided M is a complete, recurrent n-dimensional Riemannian manifold with RicM ≥ 0 and whose sectional curvatures are bounded from above. For H-surfaces we prove that a stochastically complete surface M can not be in the mean convex side of a H-surface N embedded in 3 with bounded curvature if H_M < H, or dist(M,N)=0 when H_M = H. Finally, a maximum principle at infinity is shown assuming M has non-empty boundary.