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On the third largest prime divisor of an odd perfect number

Published 26 Aug 2019 in math.NT | (1908.09420v3)

Abstract: Let $N$ be an odd perfect number and let $a$ be its third largest prime divisor, $b$ be the second largest prime divisor, and $c$ be its largest prime divisor. We discuss steps towards obtaining a non-trivial upper bound on $a$, as well as the closely related problem of improving bounds $bc$, and $abc$. In particular, we prove two results. First we prove a new general bound on any prime divisor of an odd perfect number and obtain as a corollary of that bound that $$a < 2N{\frac{1}{6}}.$$ Second, we show that $$abc < (2N){\frac{3}{5}}.$$ We also show how in certain circumstances these bounds and related inequalities can be tightened. Define a $\sigma_{m,n}$ pair to be a pair primes $p$ and $q$ where $q|\sigma(pm)$, and $p|\sigma(qn)$. Many of our results revolve around understanding $\sigma_{2,2}$ pairs. We also prove results concerning $\sigma_{m,n}$ pairs for other values of $m$ and $n$.

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