Innumber theory, a superperfect number is a positive integer n that satisfies
where σ is the divisor summatory function. Superperfect numbers are not a generalization of perfect numbers but have a common generalization. The term was coined by D. Suryanarayana (1969).[1]
The first few superperfect numbers are :
To illustrate: it can be seen that 16 is a superperfect number as σ(16) = 1 + 2 + 4 + 8 + 16 = 31, and σ(31) = 1 + 31 = 32, thus σ(σ(16)) = 32 = 2 × 16.
Ifn is an even superperfect number, then n must be a power of 2, 2k, such that 2k+1 − 1 is a Mersenne prime.[1][2]
It is not known whether there are any odd superperfect numbers. An odd superperfect number n would have to be a square number such that either norσ(n) is divisible by at least three distinct primes.[2] There are no odd superperfect numbers below 7×1024.[1]
Perfect and superperfect numbers are examples of the wider class of m-superperfect numbers, which satisfy
corresponding to m=1 and 2 respectively. For m ≥ 3 there are no even m-superperfect numbers.[1]
The m-superperfect numbers are in turn examples of (m,k)-perfect numbers which satisfy[3]
With this notation, perfect numbers are (1,2)-perfect, multiperfect numbers are (1,k)-perfect, superperfect numbers are (2,2)-perfect and m-superperfect numbers are (m,2)-perfect.[4] Examples of classes of (m,k)-perfect numbers are:
| m | k | (m,k)-perfect numbers | OEIS sequence |
|---|---|---|---|
| 2 | 2 | 2, 4, 16, 64, 4096, 65536, 262144 | A019279 |
| 2 | 3 | 8, 21, 512 | A019281 |
| 2 | 4 | 15, 1023, 29127 | A019282 |
| 2 | 6 | 42, 84, 160, 336, 1344, 86016, 550095, 1376256, 5505024 | A019283 |
| 2 | 7 | 24, 1536, 47360, 343976 | A019284 |
| 2 | 8 | 60, 240, 960, 4092, 16368, 58254, 61440, 65472, 116508, 466032, 710400, 983040, 1864128, 3932160, 4190208, 67043328, 119304192, 268173312, 1908867072 | A019285 |
| 2 | 9 | 168, 10752, 331520, 691200, 1556480, 1612800, 106151936 | A019286 |
| 2 | 10 | 480, 504, 13824, 32256, 32736, 1980342, 1396617984, 3258775296 | A019287 |
| 2 | 11 | 4404480, 57669920, 238608384 | A019288 |
| 2 | 12 | 2200380, 8801520, 14913024, 35206080, 140896000, 459818240, 775898880, 2253189120 | A019289 |
| 3 | any | 12, 14, 24, 52, 98, 156, 294, 684, 910, 1368, 1440, 4480, 4788, 5460, 5840, ... | A019292 |
| 4 | any | 2, 3, 4, 6, 8, 10, 12, 15, 18, 21, 24, 26, 32, 39, 42, 60, 65, 72, 84, 96, 160, 182, ... | A019293 |
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Divisibility-based sets of integers
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Classes of natural numbers
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