Discrepancy in modular arithmetic progressions

Abstract

Celebrated theorems of Roth and of Matousek and Spencer together show that the discrepancy of arithmetic progressions in the first n positive integers is (n1/4). We study the analogous problem in the Zn setting. We asymptotically determine the logarithm of the discrepancy of arithmetic progressions in Zn for all positive integer n. We further determine up to a constant factor the discrepancy of arithmetic progressions in Zn for many n. For example, if n=pk is a prime power, then the discrepancy of arithmetic progressions in Zn is (n1/3+rk/(6k)), where rk ∈ \0,1,2\ is the remainder when k is divided by 3. This solves a problem of Hebbinghaus and Srivastav.