The p norm of the Riesz--Titchmarsh transform for even integer p

Abstract

The long-standing conjecture that for p ∈ (1, ∞) the p( Z) norm of the Riesz--Titchmarsh discrete Hilbert transform is the same as the Lp( R) norm of the classical Hilbert transform, is verified when p = 2 n or pp - 1 = 2 n, for n ∈ N. The proof, which is algebraic in nature, depends in a crucial way on the sharp estimate for the p( Z) norm of a different variant of this operator for the full range of p. The latter result was recently proved by the authors in [Ba\~nuelos, Kwa\'snicki, On the p-norm of the discrete Hilbert transform, Duke Math. J. 168(3) (2019): 471-504].