Bilinear Hilbert Transforms and (Sub)Bilinear Maximal Functions along Convex Curves

Abstract

In this paper, we determine the Lp(R)× Lq(R)→ Lr(R) boundedness of the bilinear Hilbert transform Hγ(f,g) along a convex curve γ Hγ(f,g)(x):=p.\,v.∫-∞∞f(x-t)g(x-γ(t)) \,dtt, where p, q, and r satisfy 1p+1q=1r, and r>12, p>1, and q>1. Moreover, the same Lp(R)× Lq(R)→ Lr(R) boundedness property holds for the corresponding (sub)bilinear maximal function Mγ(f,g) along a convex curve γ Mγ(f,g)(x):=>012∫-|f(x-t)g(x-γ(t))| \,dt.