Sobolev functions on closed subsets of the real line: long version

Abstract

For each p>1 and each positive integer m we give intrinsic characterizations of the restriction of the Sobolev space Wmp(R) and homogeneous Sobolev space Lmp(R) to an arbitrary closed subset E of the real line. In particular, we show that the classical one dimensional Whitney extension operator is "universal" for the scale of Lmp(R) spaces in the following sense: for every p∈(1,∞] it provides almost optimal Lmp-extensions of functions defined on E. The operator norm of this extension operator is bounded by a constant depending only on m. This enables us to prove several constructive Wmp- and Lmp-extension criteria expressed in terms of mth order divided differences of functions.