On the Lp discrepancy of two-dimensional folded Hammersley point sets

Abstract

We give an explicit construction of two-dimensional point sets whose Lp discrepancy is of best possible order for all 1 p ∞. It is provided by folding Hammersley point sets in base b by means of the b-adic baker's transformation which has been introduced by Hickernell (2002) for b=2 and Goda, Suzuki and Yoshiki (2013) for arbitrary b∈ N, b 2. We prove that both the minimum Niederreiter-Rosenbloom-Tsfasman weight and the minimum Dick weight of folded Hammersley point sets are large enough to achieve the best possible order of Lp discrepancy for all 1 p ∞.