Constructive description of analytic Besov spaces in strictly pseudoconvex domains

Abstract This paper is devoted to investigating the boundedness, continuity and compactness for variation operators of singular integrals and their commutators on Morrey spaces and Besov spaces. More precisely, we establish the boundedness for the variation operators of singular integrals with rough kernels Ω ∈ Lq (S n−1) (q > 1) and their commutators on Morrey spaces as well as the compactness for the above commutators on Lebesgue spaces and Morrey spaces. In addition, we present a criterion on the boundedness and continuity for a class of variation operators of singular integrals and their commutators on Besov spaces. As applications, we obtain the boundedness and continuity for the variation operators of Hilbert transform, Hermit Riesz transform, Riesz transforms and rough singular integrals as well as their commutators on Besov spaces.

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Approximative characteristics and properties of operators of the best approximation of classes of functions from the Sobolev and Nikol’skii–Besov spaces

Journal of Mathematical Sciences ◽

10.1007/s10958-020-05177-2 ◽

2021 ◽

Vol 252 (4) ◽

pp. 508-525

Author(s):

Anatolii Sergiiovych Romanyuk ◽

Viktor Sergiiovych Romanyuk

Keyword(s):

Besov Spaces ◽

Best Approximation ◽

The Best Approximation

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Bekollé-Bonami estimates on some pseudoconvex domains

Bulletin des Sciences Mathématiques ◽

10.1016/j.bulsci.2021.102993 ◽

2021 ◽

pp. 102993

Author(s):

Zhenghui Huo ◽

Nathan A. Wagner ◽

Brett D. Wick

Keyword(s):

Pseudoconvex Domains

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Trace operators on fractals, entropy and approximation numbers

Georgian Mathematical Journal ◽

10.1515/gmj.2011.0030 ◽

2011 ◽

Vol 18 (3) ◽

pp. 549-575

Author(s):

Cornelia Schneider

Keyword(s):

Besov Spaces ◽

Trace Operator ◽

Approximation Numbers ◽

Atomic Decompositions ◽

Sharp Estimates ◽

Compact Embeddings ◽

Trace Space

Abstract First we compute the trace space of Besov spaces – characterized via atomic decompositions – on fractals Γ, for parameters 0 < p < ∞, 0 < q ≤ min(1, p) and s = (n – d)/p. New Besov spaces on fractals are defined via traces for 0 < p, q ≤ ∞, s ≥ (n – d)/p and some embedding assertions are established. We conclude by studying the compactness of the trace operator TrΓ by giving sharp estimates for entropy and approximation numbers of compact embeddings between Besov spaces. Our results on Besov spaces remain valid considering the classical spaces defined via differences. The trace results are used to study traces in Triebel–Lizorkin spaces as well.

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