The Marcinkiewicz-Zygmund Property for Riemann Differences with Geometric Nodes

Abstract

We study when a Riemann difference of order n possesses the Marcinkiewicz-Zygmund (MZ) property: that is, whether the conditions f(h) = o(hn-1) and Df(h) = o(hn) imply f(h) = o(hn) . This implication is known to hold for some classical examples with geometric nodes, such as \0, 1, q, …, qn-1\ and \1, q, …, qn\ , leading to a conjecture that these are the only such Riemann differences with the MZ property. However, this conjecture was disproved by the third-order example with nodes \-1, 0, 1, 2\ , and we provide further counterexamples and a general classification here. We establish a complete analytic criterion for the MZ property by developing a recurrence framework: we analyze when a function R(h) satisfying D(h) = R(qh) - A R(h) , together with D(h) = o(hn) and R(h) = o(hn-1) , forces R(h) = o(hn) . We prove that this holds if and only if A lies outside a critical modulus annulus determined by q and n , covering both |q| > 1 and |q| < 1 cases. This leads to a complete characterization of all Riemann differences with geometric nodes that possess the MZ property, and provides a flexible analytic framework applicable to broader classes of generalized differences.