Sparse Bounds for Oscillatory and Random Singular Integrals
Abstract
Let TP f (x) = ∫ e i P (y) K (y) f (x-y) \; dy , where K (y) is a smooth Calder\'on-Zygmund kernel on R n, and P be a polynomial. We show that there is a sparse bound for the bilinear form TP f, g . This in turn easily implies Ap inequalities. The method of proof is applied in a random discrete setting, yielding the first weighted inequalities for operators defined on sparse sets of integers.
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