The Boundedness of the (Sub)Bilinear Maximal Function along "non-flat" smooth curves

Abstract

Let NF be the class of smooth non-flat curves near the origin and near infinity previously introduced by the second author and let γ∈NF. We show - via a unifying approach relative to the correspondent bilinear Hilbert transform H - that the (sub)bilinear maximal function along curves =(t,-γ(t)) defined as M(f,g)(x):=ε>0 12ε ∫-εε |f(x-t)\,g(x+γ(t))|\,dt is bounded from Lp(R)× Lq(R) Lr(R) for all p, q and r H\"older indices, that is 1p+1q=1r, with 1<p,\,q≤∞ and 1 r≤∞. This is the maximal boundedness range for M, that is, our result is sharp.