A number n such that σ^2(n) = σ(σ(n)) = 2n, where σ(n) is the divisor function is called a superperfect number. Even superperfect numbers are just 2^(p - 1), where M_p = 2^p - 1 is a Mersenne prime. If any odd superperfect numbers exist, they are square numbers and either n or σ(n) is divisible by at least three distinct primes.
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