Combinatorial Number Theory: Proceedings of the Integers Conference 2023, edited by Bruce M. Landman, Florian Luca, Melvyn Nathanson, Jaroslav Nešetřil and Aaron Robertson, Berlin, Boston: De Gruyter, 2025, pp. 251-268.
ISSN/ISBN: Not available at this time. DOI: 10.1515/9783111395593-018
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Abstract: Let P(n) denote the multiset of all parts of all partitions of n. We study various digital questions concerning P(n), and show that it satisfies the generalized Benford’s law and is also asymptotically normal regardless of base.
Bibtex:
@inbook{,
url = {https://doi.org/10.1515/9783111395593-018},
title = {Digital problems in the theory of partitions},
booktitle = {Combinatorial Number Theory},
booktitle = {Proceedings of the Integers Conference 2023},
author = {Joseph Vandehey},
editor = {Bruce M. Landman and Florian Luca and Melvyn Nathanson and Jaroslav Nešetřil and Aaron Robertson},
publisher = {De Gruyter},
address = {Berlin, Boston},
pages = {251--268},
doi = {10.1515/9783111395593-018},
isbn = {9783111395593},
year = {2025},
lastchecked = {2024-10-23}
}
Reference Type: Book Chapter
Subject Area(s): Number Theory