A weak first digit law for a class of sequences

Nyblom, Michael

A weak first digit law for a class of sequences

journal contribution

posted on 2024-11-02, 00:36 authored by Michael NyblomMichael Nyblom

A non-ergodic approach is employed to establish Benford's law for the leading digit d = 1 for the sequence of powers of two. For the sequence of powers f ng, 1 < 10=9, this method is extended to obtain a weak rst digit law by establishing Benford like lower and upper bounds to the asymptotic relative frequency of terms with a given leading digit.

History

Related Materials

1.
DOI - Is published in 10.12988/imf.2016.6562
2.
ISSN - Is published in 13147536

Journal

International Mathematical Forum

Volume

11

Issue

15

Start page

697

End page

702

Total pages

6

Publisher

Hikari

Place published

Bulgaria

Language

English

Copyright

Former Identifier

2006064176

Esploro creation date

2020-06-22

Fedora creation date

2017-03-14

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Keywords

Benford's law Frequency distribution

A weak first digit law for a class of sequences

History

Related Materials

Journal

Volume

Issue

Start page

End page

Total pages

Publisher

Place published

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Copyright

Former Identifier

Esploro creation date

Fedora creation date

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Keywords

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