Singular Integrals Associated to Hypersurfaces: $L^2$ Theory
arXiv:math/9711212
Abstract
We consider singular integrals associated to a classical Calderón-Zygmund kernel $K$ and a hypersurface given by the graph of $Ï(Ï(t))$ where $Ï$ is an arbitrary $C^1$ function and $Ï$ is a smooth convex function of finite type. We give a characterization of those Calderón-Zygmund kernels $K$ and convex functions $Ï$ so that the associated singular integral operator is bounded on $L^2$ for all $C^1$ functions $Ï$.