Proof of the Schiffer's conjecture
Abstract
The following conjecture has been known for many decades as Schiffer's symmetry problem (or Schiffer's conjecture): Assume that u+k2u=0 in D, u|S=0, uN|S=1, where D⊂ R3 is a bounded, connected, C2-smooth domain, S is its boundary, N is a unit normal to S pointing out of D, k2>0 is a constant. Then S is a sphere. In this paper the above conjecture is proved. It is also proved that the relation ∫Seikβ· sds=0, \,\, ∀ β∈ S2 implies that S is a sphere.
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