A Bounded Linear Extension Operator for $L^{2,p}(\R^2)$
Abstract
For a finite , , and , we produce a continuous depending linearly on , taking the same values as on , and with semi-norm minimal up to a factor . This solves the Whitney extension problem for the Sobolev space . A standard method for solving extension problems is to find a collection of local extensions, each defined on a small square, which if chosen to be mutually consistent can be patched together to form a global extension defined on the entire plane. For Sobolev spaces the standard form of consistency is not applicable due to the (generically) non-local structure of the trace norm. In this paper, we define a new notion of consistency among local Sobolev extensions and apply it toward constructing a bounded linear extension operator. Our methods generalize to produce similar results for the -dimensional case, and may be applicable toward understanding higher smoothness Sobolev extension problems.
Cite
@article{arxiv.1011.0689,
title = {A Bounded Linear Extension Operator for $L^{2,p}(\R^2)$},
author = {Arie Israel},
journal= {arXiv preprint arXiv:1011.0689},
year = {2010}
}
Comments
46 pages