Two Approximation Results for Divergence Free Measures

Abstract: In this paper we prove two approximation results for divergence free measures. The first is a form of an assertion of J. Bourgain and H. Brezis concerning the approximation of solenoidal charges in the strict topology: Given $F \in M_b(\mathbb{R}^d;\mathbb{R}^d)$ such that $\operatorname*{div} F=0$ in the sense of distributions, there exist oriented $C^1$ loops $\Gamma_{i,l}$ with associated measures $\mu_{\Gamma_{i,l}}$ such that [ F= \lim_{l \to \infty} \frac{|F|{M_b(\mathbb{R}^d;\mathbb{R}^d)}}{n_l \cdot l} \sum{i=1}^{n_l} \mu_{\Gamma_{i,l}} ] weakly-star in the sense of measures and [ \lim_{l \to \infty} \frac{1}{n_l \cdot l} \sum_{i=1}^{n_l} |\mu_{\Gamma_{i,l}}|_{M_b(\mathbb{R}^d;\mathbb{R}^d)} = 1. ] The second, which is an almost immediate consequence of the first, is that smooth compactly supported functions are dense in [ \left{ F \in M_b(\mathbb{R}^d;\mathbb{R}^d): \operatorname*{div}F=0 \right} ] with respect to the strict topology.