On the Boundedness of The Bilinear Hilbert Transform along "non-flat" smooth curves. The Banach triangle case ($L^r,\: 1\leq r<\infty$)

TL;DR

This paper proves the boundedness of the bilinear Hilbert transform along a broad class of smooth, non-flat curves in the Banach space setting, extending previous results to a larger range of Lebesgue space indices.

Contribution

It extends the boundedness results of the bilinear Hilbert transform to a wider class of curves and a larger range of Lebesgue space exponents in the Banach triangle case.

Findings

Boundedness of $H_{ ext{Gamma}}$ for $1<p< olinebreak\infty$, $1<q extless\infty$, $1 extless r<\infty$.

Extension of previous work to all indices within the Banach triangle.

Result is optimal up to endpoints.

Abstract

We show that the bilinear Hilbert transform $H_{\Gamma}$ along curves $\Gamma=(t,-\gamma(t))$ with $\gamma\in\mathcal{N}\mathcal{F}^{C}$ is bounded from $L^{p}(\mathbb{R})\times L^{q}(\mathbb{R})\,\rightarrow\,L^{r}(\mathbb{R})$ where $p,\,q,\,r$ are H\"older indices, i.e. $\frac{1}{p}+\frac{1}{q}=\frac{1}{r}$, with $1<p<\infty$, $1<q\leq\infty$ and $1\leq r<\infty$. Here $\mathcal{N}\mathcal{F}^{C}$ stands for a wide class of smooth "non-flat" curves near zero and infinity whose precise definition is given in Section 2. This continues author's earlier work on this topic, extending the boundedness range of $H_{\Gamma}$ to any triple of indices $(\frac{1}{p},\,\frac{1}{q},\,\frac{1}{r'})$ within the Banach triangle. Our result is optimal up to end-points.