On properties of geometric preduals of ${\mathbf C^{k,\omega}}$ spaces

Brudnyi, Alexander

doi:10.4171/rmi/1099

Rev. Mat. Iberoam.

2019

DOI: 10.4171/rmi/1099

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On properties of geometric preduals of ${\mathbf C^{k,\omega}}$ spaces

Alexander Brudnyi

Abstract: Let C k,ω b (R n ) be the Banach space of C k functions on R n bounded together with all derivatives of order ≤ k and with derivatives of order k having moduli of continuity majorated by c · ω, c ∈ R+, for some ω ∈ C(R+). Let C k,ω |D α f (x)| 2010 Mathematics Subject Classification. Primary 46B20; Secondary 46E15.

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Two stars theorems for traces of the Zygmund space

Brudnyi

2022

St. Petersburg Math. J.

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For a Banach space X X defined in terms of a big- O O condition and its subspace x defined by the corresponding little- o o condition, the biduality property (generalizing the concept of reflexivity) asserts that the bidual of x is naturally isometrically isomorphic to X X . The property is known for pairs of many classical function spaces (such as ( ℓ ∞ , c 0 ) (\ell _\infty , c_0) , (BMO, VMO), (Lip, lip), etc.) and plays an important role in the study of their geometric structure. The present paper is devoted to the biduality property for traces to closed subsets S ⊂ R n S\subset \mathbb {R}^n of a generalized Zygmund space Z ω ( R n ) Z^\omega (\mathbb {R}^n) . The method of the proof is based on a careful analysis of the structure of geometric preduals of the trace spaces along with a powerful finiteness theorem for the trace spaces Z ω ( R n ) | S Z^\omega (\mathbb {R}^n)|_S .

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Two stars theorems for traces of the Zygmund space

Brudnyi

2022

St. Petersburg Math. J.

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show abstract

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On properties of geometric preduals of ${\mathbf C^{k,\omega}}$ spaces

Cited by 1 publication

References 20 publications

Two stars theorems for traces of the Zygmund space

Two stars theorems for traces of the Zygmund space

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