On the upper bound of the Lp discrepancy of Halton's sequence and the Central Limit Theorem for Hammersley's net

Abstract

Let (Hs(n))n ≥ 1 be an s-dimensional Halton's sequence, and let Hs+1,N=(Hs(n),n/N)n=0N-1 be the s+1-dimensional Hammersley point set. Let D(x,(Hn)n=0N-1 ) be the local discrepancy of (Hn)n=0N-1, and let Ds,p ( (Hn)n=0N-1) be the Lp discrepancy of (Hn)n=0N-1 . It is known that N ∞ N ( N)-s/2 Ds,p (Hs(N))n=0N-1 >0. In this paper, we prove that Ds,p ((Hs(N))n=0N-1) = O(N-1 s/2 N) for \; \; N ∞. I.e., we found the smallest possible order of magnitude of Lp discrepancy of Halton's sequence. Then we prove the Central Limit Theorem for Hammersley net : equation N-1 D(x,Hs+1,N )/ Ds+1,2(Hs+1,N) w→ N(0,1), equation where x is a uniformly distributed random variable in [0,1]s+1. The main tool is the theorem on p-adic logarithmic forms.