Abstract We work with Besov spaces with Lorentz smoothness Bˢ ₐ L, ₑ (Rⁿ). Here -<s< and 0<p, q, r<. We determine the dual of Bˢ ₐ L, ₑ (Rⁿ) with the help of its characterization in terms of wavelets. In particular, when p=1 and 1<r<, the dual spaces are new Besov spaces defined by using the limiting Lorentz sequence spaces, ₑ. We apply the results to determine the dual of certain Triebel-Lizorkin-Lorentz spaces Fˢ ₐ L, ₑ (Rⁿ).
Cobos et al. (Sun,) studied this question.
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