In number theory, a hemiperfect number is a positive integer with a half-integer abundancy index. In other words, σ(n)/n = k/2 for an odd integer k, where σ(n) is the divisor function, the sum of all positive divisors of n.

The first few hemiperfect numbers are:

2, 24, 4320, 4680, 26208, 8910720, 17428320, 20427264, 91963648, 197064960, ... (sequence A159907 in the OEIS)

Example

24 is a hemiperfect number because the sum of the divisors of 24 is

1 + 2 + 3 + 4 + 6 + 8 + 12 + 24 = 60 = 5/2 × 24.

The abundancy index is 5/2 which is a half-integer.

Smallest hemiperfect numbers of abundancy k/2

The following table gives an overview of the smallest hemiperfect numbers of abundancy k/2 for k  13 (sequence A088912 in the OEIS):

kSmallest number of abundancy k/2 Number of digits
32 1
524 2
74320 4
98910720 7
1117116004505600 14
13170974031122008628879954060917200710847692800 45

The current best known upper bounds for the smallest numbers of abundancy 15/2 and 17/2 were found by Michel Marcus.[1]

The smallest known number of abundancy 15/2 is ≈ 1.274947×1088, and the smallest known number of abundancy 17/2 is ≈ 2.717290×10190.[1]

There are no known numbers of abundancy 19/2.[1]

See also

References

  1. 1 2 3 "Number Theory". Numericana.com. Retrieved 2012-08-21.


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