The Bilinear Hilbert-Carleson operator along curves. The purely non-zero curvature case

Abstract

In this paper, we provide the maximal boundedness range (up to end-points) for the Bilinear Hilbert-Carleson operator along curves in the (purely) non-zero curvature setting. More precisely, we show that the operator BHC[a,α](f1,f2)(x) := λ∈R |\,p.v.\, ∫R f1(x - a1 tα1) \,f2(x - a2 tα2) \,ei\,λ\,a3 \,tα3 \,dtt| obeys the bounds \|BHC[a,α] (f1,f2)\|Lr a \,α,r,p1,p2 \|f1\|Lp1\,\|f2\|Lp2 whenever a=(a1,a2,a3),\,α=(α1,α2,α3)∈ (R\0\)3 with α having pairwise distinct coordinates and for any H\"older range 1p1+1p2=1r with 1<p1,p2<∞ and 12<r<∞. This result is achieved via the Rank II LGC method introduced in arXiv:2308.10706.