Discrepancy estimates for index-transformed uniformly distributed sequences (Q466165)
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scientific article; zbMATH DE number 6361358
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Discrepancy estimates for index-transformed uniformly distributed sequences |
scientific article; zbMATH DE number 6361358 |
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Discrepancy estimates for index-transformed uniformly distributed sequences (English)
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24 October 2014
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In this article discrepancy bounds for index-transformed low discrepancy sequences are established. The main focus lies on sequences \((x_{f(n)})_{n\geq 0},\) where \(f(n)= s_{q}(n)\) is the \(q\)-ary sum of digits function. A general theorem allows to prove discrepancy bounds in the case when \((x_{n})\) is a Halton sequence or a digital net in \(s\) dimensions. A final section is devoted to index sequences of the type \(f(n)=\lfloor n^{\alpha}\rfloor\) with \(0<\alpha<1\).
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discrepancy
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uniform distribution
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van der Corput-sequence
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Halton-sequence
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\((t,s)\)-sequence
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sum-of-digits function
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0.87287134
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0.8703132
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0.8698952
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0.86825454
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0.8656602
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