Abstract
We establish atomic decompositions and characterizations in terms of wavelets for Besov-Lorentz spaces BqsLp,r(Rn) and for Triebel-Lizorkin-Lorentz spaces FqsLp,r(Rn) in the whole range of parameters. As application we obtain new interpolation formulae between spaces of Lorentz-Sobolev type. We also remove the restrictions on the parameters in a result of Peetre on optimal embeddings of Besov spaces. Moreover, we derive results on diffeomorphisms, extension operators and multipliers for BqsLp,∞(Rn). Finally, we describe BqsLp,r(Rn) as an approximation space, which allows us to show new sufficient conditions on parameters for BqsLp,r(Rn) to be a multiplication algebra.
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