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INICIO |
27 de julio de 2024
Recouvrements, derivation des mesures et dimensions.
| Título original | Recouvrements, derivation des mesures et dimensions. |
|---|---|
| Título inglés | Coverings, derivation of measures and dimensions. |
| Título español | Recubrimientos, derivación de medidas y dimensiones. |
| Autor/es | Assouad, Patrice ; Quentin de Gromard, Thierry |
| Organización | CNRS Univ. París XI, Orsay, Francia |
| Revista | 0213-2230 |
| Publicación | 2006, 22 (3): 893-953, 42 Ref. |
| Tipo de documento | articulo |
| Idioma | Francés |
| Resumen inglés | Let X be a set with a symmetric kernel d (not necessarily a distance). The space (X,d) is said to have the weak (resp. strong) covering property of degree ≤ m [briefly prf(m) (resp. prF(m))], if, for each family B of closed balls of (X,d) with radii in a decreasing sequence (resp. with bounded radii), there is a subfamily, covering the center of each element of B, and of order ≤ m (resp. splitting into m disjoint families). Since Besicovitch, covering properties are known to be the main tool for providing derivation theorems for any pair of measures on (X,d). Assuming that any ball for d belongs to the Baire σ-algebra for d, we show that the prf implies an almost sure derivation theorem. This implication was stated by D. Preiss when (X,d) is a complete separable metric space. With stronger measurability hypothesis (to be stated later in this paper), we show that the prf restricted to balls with constant radius implies a derivation theorem with convergence in measure. We show easily that an equivalent to the prf(m+1) (resp. to the prf(m+1) restricted to balls with constant radius) is that the Nagata-dimension (resp. the De Groot-dimension) of (X,d) is ≤ m. These two dimensions (see J.I. Nagata) are not lesser than the topological dimension ; for Rn with any given norm (n > 1), they are > n. For spaces with nonnegative curvature ≥ 0 (for example for Rn with any given norm), we express these dimensions as the cardinality of a net ; in these spaces, we give a similar upper bound for the degree of the prF (generalizing a result of Furedi and Loeb for Rn) and try to obtain the exact degree in R and R2. |
| Clasificación UNESCO | 120217 |
| Palabras clave español | Teoría de la medida ; Recubrimiento ; Espacios métricos |
| Código MathReviews | MR2320406 |
| Código Z-Math | Zbl pre05149123 |
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