On Stein's Conjecture on the Polynomial Carleson Operator
Abstract
We prove that the generalized Carleson operator Cd with polynomial phase function is of strong type (p,r), 1<r<p<∞; this yields a positive answer in the 1<p<2 case to a conjecture of Stein which asserts that for 1<p<∞ we have that Cd is of strong type (p,p). A key ingredient in this proof is the further extension of the relational time-frequency perspective (introduced in q) to the general polynomial phase.
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