Helmholtz Solutions for the Fractional Laplacian and Other Related Operators

Abstract

We show that the bounded solutions to the fractional Helmholtz equation, (-)s u= u for 0<s<1 in Rn, are given by the bounded solutions to the classical Helmholtz equation (-)u= u in Rn for n 2 when u is additionally assumed to be vanishing at ∞. When n=1, we show that the bounded fractional Helmholtz solutions are again given by the classical solutions Ax + Bx. We show that this classification of fractional Helmholtz solutions extends for 1<s 2 and s∈ N when u ∈ C∞(Rn). Finally, we prove that the classical solutions are the unique bounded solutions to the more general equation (-) u= (1)u in Rn, when is complete Bernstein and certain regularity conditions are imposed on the associated weight a(t).