Fourier-extension estimates for symmetric functions and applications to nonlinear Helmholtz equations

Abstract

We establish weighted Lp-Fourier-extension estimates for O(N-k) × O(k)-invariant functions defined on the unit sphere SN-1, allowing for exponents p below the Stein-Tomas critical exponent 2(N+1)N-1. Moreover, in the more general setting of an arbitrary closed subgroup G ⊂ O(N) and G-invariant functions, we study the implications of weighted Fourier-extension estimates with regard to boundedness and nonvanishing properties of the corresponding weighted Helmholtz resolvent operator. Finally, we use these properties to derive new existence results for G-invariant solutions to the nonlinear Helmholtz equation - u - u = Q(x)|u|p-2u, u ∈ W2,p(RN), where Q is a nonnegative bounded and G-invariant weight function.