Discrete characterizations of wave front sets of Fourier-Lebesgue and quasianalytic type

Abstract

We obtain discrete characterizations of wave front sets of Fourier-Lebesgue and quasianalytic type. It is shown that the microlocal properties of an ultradistribution can be obtained by sampling the Fourier transforms of its localizations over a lattice in Rd. In particular, we prove the following discrete characterization of the analytic wave front set of a distribution f∈D'(). Let be a lattice in Rd and let U be an open convex neighborhood of the origin such that U*=\0\. The analytic wave front set WFA(f) coincides with the complement in ×(Rd\0\) of the set of points (x0,0) for which there are an open neighborhood V⊂ (x0+U) of x0, an open conic neighborhood of 0, and a bounded sequence (fp)p ∈ N in E'( (x0+U)) with fp= f on V such that for some h > 0 \[ μ ∈ |fp (μ)| |μ|p ≤ hp+1p!\:, ∀ p ∈ N. \]