Divergence-free Hardy space on Rn
We introduce a divergence-free Hardy space Hz,div1 (R+R, RR) and prove its divergence-free atomic decomposition. We also characterize its dual space and establish a div-curl type theorem on R+3 with an application to coercivity properties of some polyconvex quadratic forms.
|Collections||ANU Research Publications|
|Source:||Science in China. Series A: Mathematics|