A metrical lower bound on the star discrepancy of digital sequences

Abstract

In this paper we study uniform distribution properties of digital sequences over a finite field of prime order. In 1998 it was shown by Larcher that for almost all s-dimensional digital sequences the star discrepancy DN satisfies an upper bound of the form DN=O(( N)s ( N)2+) for any >0. Generally speaking it is much more difficult to obtain good lower bounds for specific sequences than upper bounds. Here we show that Larchers result is best possible up to some N term. More detailed, we prove that for almost all s-dimensional digital sequences the star discrepancy satisfies DN c(q,s) ( N)s N for infinitely many N ∈ , where c(q,s)>0 only depends on q and s but not on N.