On a discrete version of Tanaka's theorem for maximal functions

Abstract

In this paper we prove a discrete version of Tanaka's Theorem Ta for the Hardy-Littlewood maximal operator in dimension n=1, both in the non-centered and centered cases. For the discrete non-centered maximal operator M we prove that, given a function f: Z R of bounded variation, Var(M f) ≤ Var(f), where Var(f) represents the total variation of f. For the discrete centered maximal operator M we prove that, given a function f: Z R such that f ∈ 1(Z), Var(Mf) ≤ C \|f\|1(Z). This provides a positive solution to a question of Hajasz and Onninen HO in the discrete one-dimensional case.