Sparse Bounds for Maximal Monomial Oscillatory Hilbert Transforms
Abstract
For each d ≥ 2, the Hilbert transform with a polynomial oscillation as below satisfies a (1, r ) sparse bound, for all r>1 H f (x) = ε ∫|y| > ε f (x-y) e 2 π i y d y\; dy . This quickly implies weak-type inequalities for the maximal truncations, which hold for A1 weights, but are new even in the case of Lebesgue measure. The unweighted weak-type estimate without maximal truncations but with arbitrary polynomials, is due to Chanillo and Christ (1987).
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