On the upper bound of the L2-discrepancy of Halton's sequence

Abstract

Let (H(n))n ≥ 0 be a 2-dimensional Halton's sequence. Let D2 ( (H(n))n=0N-1) be the L2-discrepancy of (Hn)n=0N-1 . It is known that N ∞ ( N)-1 D2 ( H(n) )n=0N-1 >0. In this paper, we prove that D2 (( H(n) )n=0N-1) =O( N) for \; \; N ∞ , i.e., we found the smallest possible order of magnitude of L2-discrepancy of a 2-dimensional Halton's sequence. The main tool is the theorem on linear forms in the p-adic logarithm.