Proyectos por año
Resumen
Suppose that ⊂ Rn+1, n ≥ 1, is a uniform domain with n-Ahlfors regular boundary and L is a (not necessarily symmetric) divergence form elliptic, real, bounded operator in . We show that the corresponding elliptic measure ωL is quantitatively absolutely continuous with respect to surface measure of ∂ in the sense that ωL ∈ A∞(σ ) if and only if any bounded solution u to Lu = 0 in is ε-approximable for any ε ∈ (0, 1). By ε-approximability of u we mean that there exists a function = ε such that u−L∞() ≤ εuL∞() and the measure μ with dμ = |∇(Y )| dY is a Carleson measure with L∞ control over the Carleson norm. As a consequence of this approximability result, we show that boundary BMO functions with compact support can have Varopoulos-type extensions even in some sets with unrectifiable boundaries, that is, smooth extensions that converge non-tangentially back to the original data and that satisfy L1-type Carleson measure estimates with BMO control over the Carleson norm. Our result complements the recent work of Hofmann and the third named author who showed the existence of these types of extensions in the presence of a quantitative rectifiability hypothesis.
Idioma original | Inglés |
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Número de artículo | 218 |
Número de páginas | 53 |
Publicación | Journal of Geometric Analysis |
Volumen | 34 |
N.º | 7 |
DOI | |
Estado | Publicada - 9 may 2024 |
Huella
Profundice en los temas de investigación de 'The A∞ Condition, ε-Approximators, and Varopoulos Extensions in Uniform Domains'. En conjunto forman una huella única.Proyectos
- 1 Activo
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INTEGRALES SINGULARES, TEORIA GEOMETRICA DE LA MEDIDA Y EDP'S
Tolsa Domenech, X. (Principal Investigator), Dabrowski ., D. M. (Colaborador/a), Gallegos Saliner, J. M. (Colaborador/a), Guillen Mola, I. (Colaborador/a), Molero Casanova, A. (Colaborador/a), Prats Soler, M. (Colaborador/a), Sakellaris , G. (Colaborador/a), Martin Pedret, J. (Investigador/a), Prat Baiget, L. (Investigador/a), Hernandez Garcia, J. (Colaborador/a) & Ville Oikari, T. (Colaborador/a)
1/09/21 → 31/08/25
Proyecto: Proyectos y Ayudas de Investigación