Strong type estimates for homogeneous Besov capacities

DOI10.1007/s00208-002-0396-3zbMath1056.31008OpenAlexW2079213305MaRDI QIDQ1395415

Publication date: 1 July 2003

Published in: Mathematische Annalen (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1007/s00208-002-0396-3

zbMATH Keywords

embedding theorem Besov spaces Besov capacities capacitory estimates

Mathematics Subject Classification ID

Spaces of measurable functions ((L^p)-spaces, Orlicz spaces, Köthe function spaces, Lorentz spaces, rearrangement invariant spaces, ideal spaces, etc.) (46E30) Maximal functions, Littlewood-Paley theory (42B25) Sobolev spaces and other spaces of ``smooth functions, embedding theorems, trace theorems (46E35) Linear operators on function spaces (general) (47B38) Fourier coefficients, Fourier series of functions with special properties, special Fourier series (42A16) Potentials and capacities on other spaces (31C15)

Related Items (34)

On fractional capacities relative to bounded open Lipschitz sets ⋮ The Besov capacity in metric spaces ⋮ Fractional non-linear regularity, potential and balayage ⋮ Bessel capacities and rectangular differentiation in Besov spaces ⋮ Homogeneous endpoint Besov space embeddings by Hausdorff capacity and heat equation ⋮ Fractional Besov trace/extension-type inequalities via the Caffarelli-Silvestre extension ⋮ Characterization of fractional Sobolev-Poincaré and (localized) Hardy inequalities ⋮ Dual characterization of fractional capacity via solution of fractional p‐Laplace equation ⋮ Application of capacities to space–time fractional dissipative equations I: regularity and the blow-up set ⋮ Besov capacity for a class of nonlocal hypoelliptic operators and its applications ⋮ Capacities and embeddings of Besov spaces via general convolution kernels ⋮ Besov and Triebel-Lizorkin capacity in metric spaces ⋮ Strengthened fractional Sobolev type inequalities in Besov spaces ⋮ Approximation and quasicontinuity of Besov and Triebel–Lizorkin functions ⋮ Quasilinear Laplace equations and inequalities with fractional orders ⋮ On simple eigenvalues of the fractional Laplacian under removal of small fractional capacity sets ⋮ New characterizations of Morrey spaces and their preduals with applications to fractional Laplace equations ⋮ \(L^q\)-extensions of \(L^p\)-spaces by fractional diffusion equations ⋮ Capacities and embeddings via symmetrization and conductor inequalities ⋮ The logarithmic Sobolev capacity ⋮ Optimal geometric estimates for fractional Sobolev capacities ⋮ Fractional capacities relative to bounded open Lipschitz sets complemented ⋮ Classes of Carleson-type measures generated by capacities ⋮ Conductor and capacitary inequalities for functions on topological spaces and their applications to Sobolev-type imbeddings ⋮ Carleson embeddings for Sobolev spaces via heat equation ⋮ Conductor inequalities and criteria for Sobolev type two-weight imbeddings ⋮ Carleson measure problems for parabolic Bergman spaces and homogeneous Sobolev spaces ⋮ Homogeneous Campanato-Sobolev classes ⋮ Conductor Inequalities and Criteria for Sobolev-Lorentz Two-Weight Inequalities ⋮ Embeddings of function spaces via the Caffarelli-Silvestre extension, capacities and Wolff potentials ⋮ Sobolev and variational capacities in the Hermite setting and their applications ⋮ Differentiability of logarithmic Besov functions in terms of capacities ⋮ Regularity and capacity for the fractional dissipative operator ⋮ Application of capacities to space-time fractional dissipative equations. II: Carleson measure characterization for \(L^q (\mathbb{R}_+^{n+1}, \mu)\)-extension

This page was built for publication: Strong type estimates for homogeneous Besov capacities