A linear operator bounded in all Besov but not in Triebel-Lizorkin spaces

Abstract

We construct a linear operator T: S'( Rn) S'( Rn) such that T: Bpqs( Rn) Bpqs( Rn) for all 0<p,q∞ and s∈ R, but T( Fpqs( Rn))⊂ Fpqs( Rn) unless p=q. As a result Triebel-Lizorkin spaces cannot be interpolated from Besov spaces unless p=q. In the appendix we purpose a question for the interpolation framework via structured Banach spaces.

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