Micro-local analysis in Fourier Lebesgue and modulation spaces. Part I

Abstract

Let ω ,ω0 be appropriate weight functions and q∈ [1,∞ ]. We introduce the wave-front set, FLq(ω)(f) of f∈ S' with respect to weighted Fourier Lebesgue space FLq(ω). We prove that usual mapping properties for pseudo-differential operators (a) with symbols a in S(ω 0), 0 hold for such wave-front sets. Especially we prove FLq(ω /ω0)( (a)f)⊂eq FLq(ω)(f) ⊂eq FLq(ω /ω0)( (a)f) (a). %% Here (a) is the set of characteristic points of a.