Singular integral operators with kernels associated to negative powers of real-analytic functions

Given a real-analytic function b(x)b(x) defined on a neighborhood of the origin with b(0)=0b(0)=0, we consider local convolutions with kernels which are bounded by |b(x)|−a|b(x)|−a, where a>0a>0 is the smallest number for which |b(x)|−a|b(x)|−a is not integrable on any neighborhood of the origin. Under appropriate first derivative bounds and a cancellation condition, we prove LpLp boundedness theorems for such operators including when the kernel is not integrable. We primarily (but not exclusively) consider the p=2p=2 situation. The operators considered generalize both local versions of Riesz transforms and some local multiparameter singular integrals. Generalizations of our results to nontranslation-invariant versions as well as singular Radon transform versions are also proven.