Cancellation for the multilinear Hilbert transform

Abstract

For any natural number k, consider the k-linear Hilbert transform Hk( f1,…,fk )(x) := p.v. ∫ R f1(x+t) … fk(x+kt)\ dtt for test functions f1,…,fk: R C. It is conjectured that Hk maps Lp1( R) × … × Lpk( R) Lp( R) whenever 1 < p1,…,pk,p < ∞ and 1p = 1p1 + … + 1pk. This is proven for k=1,2, but remains open for larger k. In this paper, we consider the truncated operators Hk,r,R( f1,…,fk )(x) := ∫r ≤ |t| ≤ R f1(x+t) … fk(x+kt)\ dtt for R > r > 0. The above conjecture is equivalent to the uniform boundedness of \| Hk,r,R \|Lp1( R) × … × Lpk( R) Lp( R) in r,R, whereas the Minkowski and H\"older inequalities give the trivial upper bound of 2 Rr for this quantity. By using the arithmetic regularity and counting lemmas of Green and the author, we improve the trivial upper bound on \| Hk,r,R \|Lp1( R) × … × Lpk( R) Lp( R) slightly to o( Rr ) in the limit Rr ∞ for any admissible choice of k and p1,…,pk,p. This establishes some cancellation in the k-linear Hilbert transform Hk, but not enough to establish its boundedness in Lp spaces.