Sign-changing solutions to Schiffer's overdetermined problem on wavy cylinder

Abstract

In this paper, we prove the existence of k families of smooth unbounded domains s⊂RN+1 with N≥1, where equation s=\(x,t)∈ RN× R: x<1+s (2πT(s)t)+s ws(2πT(s)t)\, equation such that equation - u=λ u\,\, in\,\,, \,\, ∂ u=0,\,\,u=const\,\,on\,\,∂ equation admits a bounded sign-changing solution with exactly k+1 nodal domains. These results can be regarded as counterexamples to the Schiffer conjecture on unbounded domain. These results also indicate that there exist non-spherical unbounded regions without Pompeiu property. Our construction shows that the condition "∂ is homeomorphic to the unit sphere" is necessary for Williams conjecture to hold. In addition, these conclusions may have potential applications in remote sensing or CT.