Cauchy non-integral formulas

We study certain generalized Cauchy integral formulas for gradients of solutions to second order divergence form elliptic systems, which appeared in recent work by P. Auscher and A. Ros\'en. These are constructed through functional calculus and are in general beyond the scope of singular integrals. More precisely, we establish such Cauchy formulas for solutions $u$ with gradient in weighted $L_2(\R^{1+n}_+,t^{\alpha}dtdx)$ also in the case $|\alpha|<1$. In the end point cases $\alpha= \pm 1$, we show how to apply Carleson duality results by T. Hyt\"onen and A. Ros\'en to establish such Cauchy formulas.