Regularity of the Scattering Matrix for Nonlinear Helmholtz Eigenfunctions

Abstract

We study the nonlinear Helmholtz equation ( - λ2)u = |u|p-1u on Rn, λ > 0, p ∈ N odd, and more generally (g + V - λ2)u = N[u], where g is the (positive) Laplace-Beltrami operator on an asymptotically Euclidean or conic manifold, V is a short range potential, and N[u] is a more general polynomial nonlinearity. Under the conditions (p-1)(n-1) > 4 and k > (n-1)/2, for every f ∈ Hk(Sn-1ω) of sufficiently small norm, we show there is a nonlinear Helmholtz eigenfunction taking the form equation* u(r, ω) = r-(n-1)/2 ( e-iλ r f(ω) + e+iλ r b(ω) + O(r-ε) ), as r ∞, equation* for some b ∈ Hk(Sωn-1) and ε > 0. That is, the scattering matrix f b preserves Sobolev regularity, which is an improvement over the authors' previous work with Zhang, that proved a similar result with a loss of four derivatives.