Some Korn-Hardy inequalities with power weights

In arXiv:1305.4262 Bousquet and Van Schaftingen derive a duality estimate for a certain class of canceling operators, and as an application prove new multidimensional Hardy inequalities. These methods were generalised by arXiv:1809.08485, arXiv:2012.00067 to cover Hardy-Sobolev inequalities and Stein-Weiss inequalities for cocanceling vector fields. We are motivated by these works to study Hardy-Sobolev inequalities with power weights, where the weight may grow towards infinity. These inequalities were previously inaccessible due to this growth. This note demonstrates a specific example of where the original duality estimate for canceling operators can be improved, and as an application prove Korn-Hardy inequality with power weights on \(\R^2\) with sub-quadratic growth at infinity.