On static manifolds satisfying an overdetermined Robin type condition on the boundary

Abstract

In this work, we consider static manifolds M with nonempty boundary ∂ M. In this case, we suppose that the potential V also satisfies an overdetermined Robin type condition on ∂ M. We prove a rigidity theorem for the Euclidean closed unit ball B3 in R3. More precisely, we give a sharp upper bound for the area of the zero set =V-1(0) of the potential V, when is connected and intersects ∂ M. We also consider the case where =V-1(0) does not intersect ∂ M.