The Structure of Sobolev Extension Operators

Abstract

Let Lm,p(n) denote the Sobolev space of functions whose m-th derivatives lie in Lp(n), and assume that p>n. For E ⊂ n, denote by Lm,p(E) the space of restrictions to E of functions F ∈ Lm,p(n). It is known that there exist bounded linear maps T : Lm,p(E) → Lm,p(n) such that Tf = f on E for any f ∈ Lm,p(E). We show that T cannot have a simple form called "bounded depth."