Existence and uniqueness of limits at infinity for homogeneous Sobolev functions
acceptedVersion
355.3 Kb
Koskela, P., & Nguyen, K. (2023). Existence and uniqueness of limits at infinity for homogeneous Sobolev functions. Journal of Functional Analysis, 285(11), Article 110154. https://doi.org/10.1016/j.jfa.2023.110154
Published in
Journal of Functional AnalysisDate
2023Discipline
Analyysin ja dynamiikan tutkimuksen huippuyksikköMatematiikkaAnalysis and Dynamics Research (Centre of Excellence)MathematicsAccess restrictions
Copyright
© 2023 Elsevier Inc. All rights reserved.
We establish the existence and uniqueness of limits at infinity along infinite curves outside a zero modulus family for functions in a homogeneous Sobolev space under the assumption that the underlying space is equipped with a doubling measure which supports a Poincaré inequality. We also characterize the settings where this conclusion is nontrivial. Secondly, we introduce notions of weak polar coordinate systems and radial curves on metric measure spaces. Then sufficient and necessary conditions for existence of radial limits are given. As a consequence, we characterize the existence of radial limits in certain concrete settings.
Publisher
ElsevierISSN Search the Publication Forum
0022-1236Publication in research information system
https://converis.jyu.fi/converis/portal/detail/Publication/184549146
Metadata
Show full item recordCollections
Related funder(s)
Research Council of FinlandFunding program(s)
Academy Project, AoFAdditional information about funding
Both authors have been supported by the Academy of Finland Grant number 323960.License
Except where otherwise noted, this item's license is described as CC BY-NC-ND 4.0