The boundary behavior of domains with complete translating, minimal and CMC graphs in N2× R

Abstract

In this note we discuss graphs over a domain ⊂ N2 in the product manifold N2× R. Here N2 is a complete Riemannian surface and has peice-wise smooth boundary. Let γ ⊂∂ be a smooth connected arc and be a complete graph in N2× R over . We show that if is a minimal or translating graph, then γ is a geodesic in N2. Moreover if is a CMC graph, then γ has constant principle curvature in N2. This explains the infinity value boundary condition upon domains having Jenkins-Serrin theorems on minimal and CMC graphs in N2× R.