Norm estimates for a broad class of modulation spaces, and continuity of Fourier type operators

Abstract

Let B be a normal quasi-Banach function space with respect to r0 ∈ (0,1] and v0, ω be v-moderate, and let r∈ [r0,∞ ]. Then we prove that f belongs to the modulation space M(ω , B ), iff Vφ f belongs to the Wiener amalgam space W r(ω , B ), and \| f \| M(ω , B) \| V φ f \, ω \| B \| V φ f\| W r(ω, B). We also use the results to deduce continuity for pseudo-differential operators with symbols in weighted M∞,r0-spaces, with r0 1, when acting on M(ω , B )-spaces.

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