Primitive abundant and weird numbers with many prime factors

TL;DR

This paper presents algorithms and results for enumerating primitive abundant and weird numbers with many prime factors, including the largest known primitive weird number and new examples with multiple square odd prime factors.

Contribution

It introduces an algorithm to enumerate primitive abundant numbers with fixed prime factors and provides new large primitive weird numbers and examples with multiple square odd prime factors.

Findings

Enumerated all primitive abundant numbers up to Omega=6.

Found the largest primitive weird number with 14712 digits.

Discovered new primitive weird numbers with multiple square odd prime factors.

Abstract

We give an algorithm to enumerate all primitive abundant numbers (briefly, PANs) with a fixed $\Omega$ (the number of prime factors counted with their multiplicity), and explicitly find all PANs up to $\Omega=6$, count all PANs and square-free PANs up to $\Omega=7$ and count all odd PANs and odd square-free PANs up to $\Omega=8$. We find primitive weird numbers (briefly, PWNs) with up to 16 prime factors, improving the previous results of [Amato-Hasler-Melfi-Parton] where PWNs with up to 6 prime factors have been given. The largest PWN we find has 14712 digits: as far as we know, this is the largest example existing, the previous one being 5328 digits long [Melfi]. We find hundreds of PWNs with exactly one square odd prime factor: as far as we know, only five were known before. We find all PWNs with at least one odd prime factor with multiplicity greater than one and $\Omega = 7$ and prove that there are none with $\Omega < 7$. Regarding PWNs with a cubic (or higher) odd prime factor, we prove that there are none with $\Omega\le 7$, and we did not find any with larger $\Omega$. Finally, we find several PWNs with 2 square odd prime factors, and one with 3 square odd prime factors. These are the first such examples.