Generalizations of the Erdős–Kac Theorem and the Prime Number Theorem

Wang, Biao; Wei, Zhining; Yan, Pan; Yi, Shaoyun

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2022CIMS_preprint-FinalVersion.pdf

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Author

Wang, Biao
Wei, Zhining
Yan, Pan
Yi, Shaoyun

Affiliation

Department of Mathematics, University of Arizona

Issue Date

2023-09-13

Citation

Wang, B., Wei, Z., Yan, P., & Yi, S. (2023). Generalizations of the Erd\H {o} s-Kac Theorem and the Prime Number Theorem. arXiv preprint arXiv:2303.05803.

Journal

Communications in Mathematics and Statistics

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Collection Information

This item from the UA Faculty Publications collection is made available by the University of Arizona with support from the University of Arizona Libraries. If you have questions, please contact us at repository@u.library.arizona.edu.

Abstract

In this paper, we study the linear independence between the distribution of the number of prime factors of integers and that of the largest prime factors of integers. Under a restriction on the largest prime factors of integers, we will refine the Erdős–Kac Theorem and Loyd’s recent result on Bergelson and Richter’s dynamical generalizations of the Prime Number Theorem, respectively. At the end, we will show that the analogue of these results holds with respect to the Erdős–Pomerance Theorem as well.

Note

12 month embargo; first published: 13 September 2023

ISSN

2194-6701

EISSN

2194-671X

DOI

10.1007/s40304-023-00354-6

Version

Final accepted manuscript

Collections

UA Faculty Publications