Discrepancy bounds for infinite-dimensional order two digital sequences over F2
Abstract
In this paper we provide explicit constructions of digital sequences over the finite field of order 2 in the infinite dimensional unit cube whose first N points projected onto the first s coordinates have Lq discrepancy bounded by r3/2-1/q m1s-1 + m2s-1 + ·s + mrs-1 N-1 for all N = 2m1 + 2m2 + ·s + 2mr 2 and 2 q < ∞. In particular we have for N = 2m that the Lq discrepancy is of order m(s-1)/2 2-m for all 2 q < ∞.
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