On the size of Nikodym sets in spaces over rings

Abstract

A Nikodym set N⊂eq(Z/(NZ))n is a set containing L\x\ for every x∈(Z/(NZ))n, where L is a line passing through x. We prove that if N is square-free, then the size of every Nikodym set is at least cnNn-o(1), where cn only depends on n. This result is an extension of the result in the finite field case.