The Abundancy Index of Divisors of Odd Perfect Numbers
Abstract
If N = qkn2 is an odd perfect number, where q is the Euler prime, then we show that n < q is sufficient for Sorli's conjecture that k = q(N) = 1 to hold. We also prove that qk < 2/3n2, and that I(qk) < I(n), where I(x) is the abundancy index of x.
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