Lp estimates for the bilinear Hilbert transform for 1/2<p≤2/3: A counterexample and generalizations to non-smooth symbols

Abstract

M. Lacey and C. Thiele proved in [27] (Annals of Math. (1997)) and [28] (Annals of Math. (1999)) that the bilinear Hilbert transform maps Lp1× Lp2→ Lp boundedly when 1p1+1p2=1p with 1<p1, \, p2≤∞ and 23<p<∞. Whether the Lp estimates hold in the range p∈ (1/2,2/3] has remained an open problem since then. In this paper, we prove that the bilinear Hilbert transform does not map FLp'1× Lp2→ Lp for p1<2 and Lp1× FLp'2→ Lp for p2<2 boundedly (Theorem 1.2). In particular, this shows that the bilinear Hilbert transform neither maps FLp'1× Lp2→ Lp nor Lp1× FLp'2→ Lp for 12<p<23. Nevertheless, we can establish Lp estimates for the bilinear Fourier multipliers whose symbols are not identical to but arbitrarily close to that of the bilinear Hilbert transform in the full range p∈(1/2,∞) (Theorem 1.3).