On a problem of Pichorides

Abstract

Let S() denote the classical Littlewood-Paley square function formed with respect to a lacunary sequence of positive integers. Motivated by a remark of Pichorides, we obtain sharp asymptotic estimates of the behaviour of the operator norm of S() from the analytic Hardy space HpA (T) to Lp (T) and of the behaviour of the Lp (T) → Lp (T) operator norm of S() (1 < p < 2) in terms of the ratio of the lacunary sequence . Namely, if denotes the ratio of , then we prove that \| f \|Lp (T) = 1 \\ f ∈ HpA (T) \| S() (f) \|Lp (T) 1p-1 ( - 1 )-1/2 (1<p<2) and \| S() \|Lp (T) → Lp (T) 1(p-1)3/2 ( - 1 )-1/2 (1<p<2) and that the exponents r=1/2 in ( - 1 )-1/2 cannot be improved in general. Variants in higher dimensions and in the Euclidean setting are also obtained.