Discrepancy bounds for β-adic Halton sequences

Abstract

Van der Corput and Halton sequences are well-known low-discrepancy sequences. Almost twenty years ago Ninomiya defined analogues of van der Corput sequences for β-numeration and proved that they also form low-discrepancy sequences if β is a Pisot number. Only very recently Robert Tichy and his co-authors succeeded in proving that β-adic Halton sequences are equidistributed for certain parameters β=(β1,…,βs) using methods from ergodic theory. In the present paper we continue this research and give discrepancy estimates for β-adic Halton sequences for which the components βi are m-bonacci numbers. Our methods are quite different and use dynamical and geometric properties of Rauzy fractals that allow to relate β-adic Halton sequences to rotations on high dimensional tori. The discrepancies of these rotations can then be estimated by classical methods relying on W.~M.~Schmidt's Subspace Theorem.