Sobolev spaces of vector-valued functions

Abstract

We are concerned here with Sobolev-type spaces of vector-valued functions. For an open subset ⊂RN and a Banach space V, we compare the classical Sobolev space W1,p(, V) with the so-called Sobolev-Reshetnyak space R1,p(, V). We see that, in general, W1,p(, V) is a closed subspace of R1,p(, V). As a main result, we obtain that W1,p(, V)=R1,p(, V) if, and only if, the Banach space V has the Radon-Nikod\'ym property