Overdetermined problems with fractional Laplacian

Abstract

Let N≥ 1 and s∈ (0,1). In the present work we characterize bounded open sets with C2 boundary (not necessarily connected) for which the following overdetermined problem equation* ( -)s u = f(u) in , u=0 in RN , (∂η)s u=Const. on ∂ equation* has a nonnegative and nontrivial solution, where η is the outer unit normal vectorfield along ∂ and for x0∈∂ \[ (∂η)su(x0)=-t 0u(x0-tη(x0))ts. \] Under mild assumptions on f, we prove that must be a ball. In the special case f 1, we obtain an extension of Serrin's result in 1971. The fact that is not assumed to be connected is related to the nonlocal property of the fractional Laplacian. The main ingredients in our proof are maximum principles and the method of moving planes.