On the endpoint regularity of discrete maximal operators

Abstract

Given a discrete function f:d we consider the maximal operator Mf(n) = r≥0 1N(r) Σm ∈ r |f(n + m)|, where \r\r ≥ 0 are dilations of a convex set (open, bounded and with Lipschitz boudary) containing the origin and N(r) is the number of lattice points inside r. We prove here that the operator f ∇ M f is bounded and continuous from l1(d) to l1(d). We also prove the same result for the non-centered version of this discrete maximal operator.