Sparse Bounds for Maximally Truncated Oscillatory Singular Integrals

Abstract

For polynomial P (x,y), and any Calder\'on-Zygmund kernel, K, the operator below satisfies a (1,r) sparse bound, for 1< r ≤ 2. ε >0 ∫|y| > ε f (x-y) e 2 π i P (x,y) K(y) \; dy The implied bound depends upon P (x,y) only through the degree of P. We derive from this a range of weighted inequalities, including weak type inequalities on L 1 (w), which are new, even in the unweighted case. The unweighted weak-type estimate, without maximal truncations, is due to Chanillo and Christ (1987).