Arithmetic properties of the sum of divisors

Abstract

The divisor function σ(n) denotes the sum of the divisors of the positive integer n. For a prime p and m ∈ N, the p-adic valuation of m is the highest power of p which divides m. Formulas for p(σ(n)) are established. For p=2, these involve only the odd primes dividing n. These expressions are used to establish the bound 2(σ(n)) ≤ 2(n) , with equality if and only if n is the product of distinct Mersenne primes, and for an odd prime p, the bound is p(σ(n)) ≤ p(n) , with equality related to solutions of the Ljunggren-Nagell diophantine equation.