Sign-changing solution for an overdetermined elliptic problem on unbounded domain

Abstract

We prove the existence of two smooth families of unbounded domains in RN+1 with N≥1 such that equation - u=λ u\,\, in\,\,, \,\, u=0,\,\,∂ u=const\,\,on\,\,∂ equation admits a sign-changing solution. The domains bifurcate from the straight cylinder B1× R, where B1 is the unit ball in RN. These results can be regarded as counterexamples to the Berenstein conjecture on unbounded domain. Unlike most previous papers in this direction, a very delicate issue here is that there may be two-dimensional kernel space at some bifurcation point. Thus a Crandall-Rabinowitz type bifurcation theorem from high-dimensional kernel space is also established to achieve the goal.