On H=W in Banach function spaces

Abstract

In this paper we prove ``H=W" in the context of a Banach function space X(Ω). Let Ω be a subset of Rn and denote by W1X(Ω) the collection of all those f∈ X(Ω) whose distributional derivatives ∂jf are contained in X(Ω). Our main result provides a small collection of ``universal" hypotheses on X(Ω) that ensure W1X(Ω) is equal to H1X(Ω), the formal closure of Lip(Ω) W1X(Ω) with respect to the norm \[\|f\|W1X(Ω) = \|f\|X(Ω) + \|∇ f\|X(Ω).\] The main theorem has two corollaries. The first gives a slightly stronger set of hypotheses for ``H=W", and the second gives density of C∞c( Rn) in W1X( Rn).