Density of smooth maps for fractional Sobolev spaces Ws, p into simply connected manifolds when s 1

Abstract

Given a compact manifold Nn ⊂ R, s 1 and 1 p < ∞, we prove that the class of smooth maps on the cube with values into Nn is strongly dense in the fractional Sobolev space Ws, p(Qm; Nn) when Nn is sp simply connected. For sp integer, we prove weak density of smooth maps with values into Nn when Nn is sp - 1 simply connected. The proofs are based on the existence of a retraction of R onto Nn except for a small subset of Nn and on a pointwise estimate of fractional derivatives of composition of maps in Ws, p W1, sp.