Confirmed answer to the Schiffer conjecture and the Berenstein conjecture

Abstract

Let be a bounded domain in RN+1 with a connected C2,ε (ε∈(0,1)) boundary. We show that, if the following overdetermined elliptic problem equation - u=α u\,\, in\,\,, \,\, u=0\,\,on\,\, ∂,\,\,∂ u∂ n =c\,\,on\,\,∂ equation has a nontrivial solution, then is a ball, which is exactly the affirmative answer to the Berenstein conjecture. Similarly, we show that, if has a Lipschitz connected boundary and the following overdetermined elliptic problem equation - u=α u\,\, in\,\,, \,\, ∂ u∂ n=0\,\,on\,\, ∂,\,\,u =c\,\,on\,\,∂ equation has a nontrivial solution, then is also a ball, which is exactly the affirmative answer to the Schiffer conjecture.