On a problem of De Koninck
Abstract
Let σ(n) and γ(n) denote the sum of divisors and the product of distinct prime divisors of n respectively. We shall show that, if n≠ 1, 1782 and σ(n)=(γ(n))2, then there exist odd (not necessarily distinct) primes p, p and (not necessarily odd) distinct primes qi (i=1, 2, …, k) such that p, p n, qi2 n (i=1, 2, …, k) and q1 σ(p2), qi+1σ(qi2) (1≤ i≤ k-1), p σ(qk2).
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