Unbounded periodic solutions to Serrin's overdetermined boundary value problem

Abstract

We study the existence of nontrivial unbounded domains in RN such that the overdetermined problem - u = 1 in , u=0, ∂ u=const on ∂ admits a solution u. By this, we complement Serrin's classification result from 1971 which yields that every bounded domain admitting a solution of the above problem is a ball in RN. The domains we construct are periodic in some variables and radial in the other variables, and they bifurcate from a straight (generalized) cylinder or slab. We also show that these domains are uniquely self Cheeger relative to a period cell for the problem.