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Dyadic diaphony of digital sequences

Friedrich Pillichshammer — 2007

Journal de Théorie des Nombres de Bordeaux

The dyadic diaphony is a quantitative measure for the irregularity of distribution of a sequence in the unit cube. In this paper we give formulae for the dyadic diaphony of digital $(0, s)$ -sequences over $ℤ_{2}$ , $s = 1, 2$ . These formulae show that for fixed $s \in {1, 2}$ , the dyadic diaphony has the same values for any digital $(0, s)$ -sequence. For $s = 1$ , it follows that the dyadic diaphony and the diaphony of special digital $(0, 1)$ -sequences are up to a constant the same. We give the exact asymptotic order of the dyadic diaphony of digital...

Improved upper bounds for the star discrepancy of digital nets in dimension 3

Friedrich Pillichshammer — 2003

Acta Arithmetica

A generalization of NUT digital (0,1)-sequences and best possible lower bounds for star discrepancy

Henri Faure; Friedrich Pillichshammer — 2013

Acta Arithmetica

In uniform distribution theory, discrepancy is a quantitative measure for the irregularity of distribution of a sequence modulo one. At the moment the concept of digital (t,s)-sequences as introduced by Niederreiter provides the most powerful constructions of s-dimensional sequences with low discrepancy. In one dimension, recently Faure proved exact formulas for different notions of discrepancy for the subclass of NUT digital (0,1)-sequences. It is the aim of this paper to generalize the concept...

Optimal 𝓛₂ discrepancy bounds for higher order digital sequences over the finite field 𝔽₂

Josef Dick; Friedrich Pillichshammer — 2014

Acta Arithmetica

On the mean square weighted ℒ₂ discrepancy of randomized digital (t,m,s)-nets over ℤ₂

Josef Dick; Friedrich Pillichshammer — 2005

Acta Arithmetica

$L_{2}$ discrepancy of generalized Zaremba point sets

Henri Faure; Friedrich Pillichshammer — 2011

Journal de Théorie des Nombres de Bordeaux

We give an exact formula for the $L_{2}$ discrepancy of a class of generalized two-dimensional Hammersley point sets in base $b$ , namely generalized Zaremba point sets. These point sets are digitally shifted Hammersley point sets with an arbitrary number of different digital shifts in base $b$ . The Zaremba point set introduced by White in 1975 is the special case where the $b$ shifts are taken repeatedly in sequential order, hence needing at least $b^{b}$ points to obtain the optimal order of $L_{2}$ discrepancy. On the...

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Currently displaying 1 – 11 of 11

Dyadic diaphony of digital sequences

Improved upper bounds for the star discrepancy of digital nets in dimension 3

A generalization of NUT digital (0,1)-sequences and best possible lower bounds for star discrepancy

Optimal 𝓛₂ discrepancy bounds for higher order digital sequences over the finite field 𝔽₂

On the mean square weighted ℒ₂ discrepancy of randomized digital (t,m,s)-nets over ℤ₂

$L_{2}$ discrepancy of generalized Zaremba point sets

Points sets with low $L_{p}$ discrepancy

Distribution properties of sequences generated by Q-additive functions with respect to Cantor representation of integers

L₂ discrepancy of generalized two-dimensional Hammersley point sets scrambled with arbitrary permutations

A note on the figure of merit of 2-dimensional rank 2 lattice rules.

Improvements of the discrepancy of the van der Corput sequence.