Closure of Smooth Maps in $W^{1,p}(B^3;S^2)$

Jean Van Schaftingen

Closure of Smooth Maps in W1,p(B3;S2)

Abstract

For every 2 < p < 3, we show that u ∈ W1,p(B3; S2) can be strongly approximated by maps in C∞(B3; S2) if, and only if, the distributional Jacobian of u vanishes identically. This result was originally proved by Bethuel-Coron-Demengel-Helein, but we present a different strategy which is motivated by the W2,p-case.

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