Adrian W. Dudek, Daniel R. Johnston
Published 2025-01-29, updated 2025-06-24Version 3
We prove that for all $n\geq 1$ there exists a number between $n^2$ and $(n+1)^2$ with at most 4 prime factors. This is the first result of this kind that holds for every $n\geq 1$ rather than just sufficiently large $n$. Our approach relies on a recent computation by Sorenson and Webster, along with an explicit version of the linear sieve. As part of our proof, we also prove an explicit version of Kuhn's weighted sieve. This is done for generic sifting sets to enhance the future applicability of our methods.
Comments: 16 pages, to appear in Journal of Number Theory
3-tuples have at most 7 prime factors infinitely often
Reducing the number of prime factors of long $κ$-tuples
Orders of reductions of elliptic curves with many and few prime factors
![QR code for arXiv:2501.18048 [math.NT]](http://oss.arxitics.com/images/favicon.svg)