TY - Type of reference TI - Caractérisation de sous-espaces vectoriels fermés des espaces de Morrey et approximation AU - Nouffou Diarra AU - Ibrahim Fofana AB - Let $$$1\leq q\leq\alpha < \infty. \left\{(L^{q}, l^{p})^{\alpha}(\mathbb{R}^d):\alpha\leq p\leq\infty \right\}$$$ is a nondecreasing family of Banach spaces such that the Lebesgue space is $$$L^{\alpha}(\mathbb{R}^d)$$$ its minimal element and the classical Morrey space $$$\mathcal{M}_{q}^{\alpha}(\mathbb{R}^d)$$$ is its maximal element. In this note we investigate some closed linear subspaces of $$$(L^{q}, l^{p})^{\alpha}(\mathbb{R}^d)$$$. We give a characterization of the closure in $$$(L^{q}, l^{p})^{\alpha}(\mathbb{R}^d)$$$ of the set of all its compactly supported elements and study the action of some classical operators on it. We also describe the closure in $$$(L^{q}, l^{p})^{\alpha}(\mathbb{R}^d)$$$ of the set $$$\mathcal{C}_{\rm{c}}^{\infty}(\mathbb{R}^d)$$$ of all infinitely differentiable and compactly supported functions on $$$\mathbb{R}^{d}$$$ as an intersection of other linear subspaces of $$$(L^{q}, l^{p})^{\alpha}(\mathbb{R}^d)$$$ and obtain the weak density of $$$\mathcal{C}_{\rm{c}}^{\infty}(\mathbb{R}^d)$$$ in some of these subspaces. We establish a necessary condition on a function $$$f$$$ in order that its Riesz potential $$$I_{\gamma}(|f|) \;(0<\gamma<1)$$$ be in a given Lebesgue space. DO - 10.21494/ISTE.OP.2023.0980 JF - Avancées en Mathématiques Pures et Appliquées KW - Closed linear subspaces, Approximation, Adams-Spanne type theorem, Riesz potential, Fractional maximal operator, Closed linear subspaces, Approximation, Adams-Spanne type theorem, Riesz potential, Fractional maximal operator, L1 - https://www.openscience.fr/IMG/pdf/iste_apam23v14n3_3.pdf LA - fr PB - ISTE OpenScience DA - 2023/06/15 SN - 1869-6090 TT - Characterization of some closed linear subspaces of Morrey spaces and approximation UR - https://www.openscience.fr/Caracterisation-de-sous-espaces-vectoriels-fermes-des-espaces-de-Morrey-et IS - Numéro 3 (Juin 2023) VL - 14 ER -