Daniel Larsen
Published 2021-11-05, updated 2023-10-18Version 2
Alford, Granville, and Pomerance proved that there are infinitely many Carmichael numbers. In the same paper, they ask if a statement analogous to Bertrand's postulate could be proven for Carmichael numbers. In this paper, we answer this question, proving the stronger statement that for all $\delta>0$ and $x$ sufficiently large in terms of $\delta$, there exist at least $e^{\frac{\log x}{(\log\log x)^{2+\delta}}}$ Carmichael numbers between $x$ and $x+\frac{x}{(\log x)^{\frac{1}{2+\delta}}}$.
Comments: 27 pages; corrected minor issues
Journal: Int. Math. Res. Not. (2023), no. 15, 13072-13098
A note on Carmichael numbers in residue classes
On the distribution of Carmichael numbers
The Carmichael numbers up to $10^{16}$
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