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On Geometric Preduals of Jet Spaces on Closed Subsets of ${\mathbb R}^n$
C. R. Math. Rep. Acad. Sci. Canada Vol. 42 (1) 2020, pp. 10-20
Alexander Brudnyi; Almaz Butaev (Received: 2020/03/18, Revised: 2020/04/02)

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Let \(C_b^{k,\omega}({\mathbb R}^n)\) be the Banach space of \(C^k\) functions on \({\mathbb R}^n\) bounded together with all derivatives of order \(\le k\) , where the derivatives of order \(k\) have moduli of continuity majorization by \(c\,\omega\) , \(c\in\mathbb R_+\) , for some \(\omega\in C(\mathbb R_+)\) . For a closed set \(S\subset{\mathbb R}^n\) the jet space \(J_b^{k,\omega}(S)\) is the Banach space of vector functions whose components are partial derivatives of functions in \(C_b^{k,\omega}({\mathbb R}^n)\) evaluated at points of \(S\) equipped with the corresponding quotient norm. The geometric predual \(G_J^{k,\omega}(S)\) of \(J_b^{k,\omega}(S)\) is the minimal closed subspace of the dual \(\bigl(C_b^{k,\omega}({\mathbb R}^n)\bigr)^*\) containing the evaluation functionals of all partial derivatives of order \(\le k\) at points in \(S\) . In the paper we study some geometric properties of spaces \(G_J^{k,\omega}(S)\) related to the classical Whitney problems.

Soit \(C_b^{k,\omega}({\mathbb R}^n)\) l’espace de Banach des fonctions \(C^k\) sur \({\mathbb R}^n\) bornées avec toutes les dérivées d’ordre \(k\) , où les dérivés d’ordre \(k\) ont des modules de continuités majorés par \(c\,\omega\) , \(c\in\mathbb R_+\) , pour quelques \(\omega\in C(\mathbb R_+)\) . Pour un ensemble fermé \(S\subset{\mathbb R}^n\) l’espace de jet \(J_b^{k,\omega}(S)\) est l’espace de Banach des fonctions vectorielles dont les composantes sont des dérivées partielles des fonctions en \(C_b^{k,\omega}({\mathbb R}^n)\) évaluées aux points de \(S\) équipés de la norme du quotient correspondante. Le prédual géométrique \(G_J^{k,\omega}(S)\) de \(J_b^{k,\omega}(S)\) est le sous-espace minimal fermé du dual \(\bigl(C_b^{k,\omega}({\mathbb R}^n)\bigr)^*\) contenant les fonctionnelles d’évaluation de toutes les dérivées partielles d’ordre \(\le k\) aux points de \(S\) . Dans cet article, nous étudions certaines propriétés géométriques des espaces \(G_J^{k,\omega}(S)\) liées aux problèmes classiques de Whitney.

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algebraic number theory approximation property automorphisms Bessel functions Boson-fermion correspondence C*-algebra Carmichael number center problem Chebyshev transform classification Classification of simple C*-algebras composition operators continued fractions Cuntz Semigroup elliptic curves fixed point Fourier transform function fields. functoriality general relativity generic property ideals indefinite inner product inductive limits of sub-homogeneous C*- algebras Irrational rotation algebra J-Hermitian matrix K-theory Kahler manifolds L-functions maximal ideal space nonexpansive mapping numerical range orthogonal polynomials Predual space prime number property SP Renormalization rotation algebras Salem number semi-reciprocal polynomials tracially approximate splitting interval algebras unbounded traces uniqueness Weak Markov set Whitney problems

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