On the boundedness of the curved trilinear Hilbert transform and the curved n-linear maximal operator in the quasi-Banach regime

Abstract

Let n∈N, α=(α1,…,αn)∈ (0,∞)n, β=(β1,…,βn)∈ (R\0\)n, f:=(f1,…, fn)∈ Sn(R) and set Hn,α,β(f)(x):=p.v. ∫R f1(x+β1 tα1)… fn(x+βn tαn) dtt, x ∈ R\,, with Mn,α,β being its maximal operator counterpart. Assume that 1<pj<∞ and 12<r<∞ satisfy Σj=1n 1pj=1r. Under the non-resonant assumption that \αj\j=1n are pairwise distinct we show that \|H3,α,β(f)\|Lrα,β Πj=13\|fj\|Lpj and \|Mn,α,β\|Lrn,α,β Πj=1n\|fj\|Lpj ∀\:n≥ 2\,. (For the maximal operator the boundedness range can be extended to include the endpoint ∞ for both pj and r.)

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