Anisotropic Sobolev Capacity with Fractional Order
From MaRDI portal
Publication:4978567
DOI10.4153/CJM-2015-060-3zbMath1381.46034arXiv1410.0423OpenAlexW3102933129MaRDI QIDQ4978567
Publication date: 25 August 2017
Published in: Canadian Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1410.0423
isoperimetric inequalitysharpnessMinkowski inequalityfractional Sobolev capacityfractional perimeter
Sobolev spaces and other spaces of ``smooth functions, embedding theorems, trace theorems (46E35) Length, area, volume and convex sets (aspects of convex geometry) (52A38) Potentials and capacities on other spaces (31C15)
Related Items (7)
On fractional capacities relative to bounded open Lipschitz sets ⋮ Anisotropic versions of the Brezis-Van Schaftingen-Yung approach at \(s = 1\) and \(s = 0\) ⋮ Dual characterization of fractional capacity via solution of fractional p‐Laplace equation ⋮ Besov capacity for a class of nonlocal hypoelliptic operators and its applications ⋮ A mixed volume from the anisotropic Riesz‐potential ⋮ Fractional capacities relative to bounded open Lipschitz sets complemented ⋮ Fractional Sobolev norms and BV functions on manifolds
This page was built for publication: Anisotropic Sobolev Capacity with Fractional Order
