A maximal function for families of Hilbert transforms along homogeneous curves
Abstract
Let H(u) be the Hilbert transform along the parabola (t, ut2) where u∈ R. For a set U of positive numbers consider the maximal function HU \!f= \|H(u)\! f|: u∈ U\. We obtain an (essentially) optimal result for the Lp operator norm of HU when 2<p<∞. The results are proved for families of Hilbert transforms along more general nonflat homogeneous curves.
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