A unified approach to three themes in harmonic analysis (1st part)

Abstract

In the present paper and its sequel "A unified approach to three themes in harmonic analysis (2nd part)", we address three rich historical themes in harmonic analysis that rely fundamentally on the concept of non-zero curvature. Namely, we focus on the boundedness properties of (I) the linear Hilbert transform and maximal operator along variable curves, (II) Carleson-type operators in the presence of curvature, and (III) the bilinear Hilbert transform and maximal operator along variable curves. Our Main Theorem states that, given a general variable curve γ(x,t) in the plane that is assumed only to be measurable in x and to satisfy suitable non-zero curvature (in t) and non-degeneracy conditions, all of the above itemized operators defined along the curve γ are Lp-bounded for 1<p<∞. Our result provides a new and unified treatment of these three themes. Moreover, it establishes a unitary approach for both the singular integral and the maximal operator versions within themes (I) and (III). At the heart of our approach stays a methodology encompassing three key ingredients: 1) discretization on the multiplier side that confines the phase of the multiplier to oscillate at the linear level, 2) Gabor-frame discretization of the input function(s) and 3) extraction of the cancelation hidden in the non-zero curvature of γ via TT*-orthogonality methods and time-frequency correlation.