Delaunay type domains for an overdetermined elliptic problem in Sn x R and Hn x R

Abstract

We prove the existence of a countable family of Delaunay type domains j in Mn x R, where Mn is the Riemannian manifold Sn or Hn and n is at least 2, bifurcating from the cylinder Bn x R (where Bn is a geodesic ball of radius 1 in Mn) for which the first eigenfunction of the Laplace-Beltrami operator with zero Dirichlet boundary condition also has constant Neumann data at the boundary. The domains j are rotationally symmetric and periodic with respect to the R-axis of the cylinder and as j converges to 0 the domain j converges to the cylinder Bn x R.