On a Carleson-Radon Transform (the non-resonant setting)
Abstract
Given a curve γ=(tα1, tα2, tα3) with α=(α1,α2,α3)∈ R+3, we define the Carleson-Radon transform along γ by the formula C[α]f(x,y):=a∈ R|p.v.\,∫R f (x-tα1,y-tα2)\,ei\,a\,tα3\,dtt|\,. We show that in the non-resonant case, that is, when the coordinates of α are pairwise disjoint, our operator C[α] is Lp bounded for any 1<p<∞. Our proof relies on the (Rank I) LGC-methodology introduced in arXiv:1902.03807 and employs three key elements: 1) a partition of the time-frequency plane with a linearizing effect on both the argument of the input function and on the phase of the kernel; 2) a sparse-uniform dichotomy analysis of the Gabor coefficients associated with the input/output function; 3) a level set analysis of the time-frequency correlation set.
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