Abundant number

In mathematics, an abundant number or excessive number is a number "n" for which "σ"("n") > 2"n". Here "σ"("n") is the sum-of-divisors function: the sum of all positive divisors of "n", including "n" itself. The value "σ"("n") − 2"n" is called the abundance of "n". An equivalent definition is that the "proper divisors" of the number (the divisors except the number itself) sum to more than the number.

The first few abundant numbers OEIS|id=A005101 are::12, 18, 20, 24, 30, 36, 40, 42, 48, 54, 56, 60, 66, 70, 72, 78, 80, 84, 88, 90, 96, 100, 102, …As an example, consider the number 24. Its divisors are 1, 2, 3, 4, 6, 8, 12 and 24, whose sum is 60. Because 60 is more than 2 × 24, the number 24 is abundant. Its abundance is 60 − 2 × 24 = 12.

The smallest abundant number not divisible by two, i.e. odd, is 945, and the smallest not divisible by 2 or by 3 is 5391411025 whose prime factors are 5², 7, 11, 13, 17, 19, 23, and 29. An algorithm given by Iannucci in 2005 shows how to find the smallest abundant not divisible by the first $k$ primes. If $A(k)$ represents the smallest abundant number not divisible by the first $k$ primes then for all $epsilon>0$ we have $(1-epsilon)(kln k)^{2-epsilon} for k sufficiently large.$

Infinitely many even and odd abundant numbers exist. Marc Deléglise showed in 1998 that the natural density of abundant numbers is between 0.2474 and 0.2480. Every proper multiple of a perfect number, and every multiple of an abundant number, is abundant. Also, every integer greater than 20161 can be written as the sum of two abundant numbers. An abundant number which is not a semiperfect number is called a weird number; an abundant number with abundance 1 is called a quasiperfect number.

Closely related to abundant numbers are perfect numbers with "σ"("n") = 2"n", and deficient numbers with "σ"("n") < 2"n". The natural numbers were first classified as either deficient, perfect or abundant by Nicomachus in his "Introductio Arithmetica" (circa 100).

External links

* [http://primes.utm.edu/glossary/page.php?sort=AbundantNumber The Prime Glossary: Abundant number]
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References

* M. Deléglise, " [http://projecteuclid.org/DPubS/Repository/1.0/Disseminate?view=body&id=pdf_1&handle=euclid.em/1048515661 Bounds for the density of abundant integers,] " "Experimental Math.," 7:2 (1998) p. 137-143.

* D. Iannucci, "On the smallest abundant number not divisible by the first $k$ primes" "Bull. Belgian Math. Soc.," 12(2005), 39--44.

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Abundant number — Abundant A*bun dant, a. [OE. (h)abundant, aboundant, F. abondant, fr. L. abudans, p. pr. of abundare. See {Abound}.] Fully sufficient; plentiful; in copious supply; followed by in, rarely by with. Abundant in goodness and truth. Exod. xxxiv. 6.… … The Collaborative International Dictionary of English
Abundant number — Number Num ber (n[u^]m b[ e]r), n. [OE. nombre, F. nombre, L. numerus; akin to Gr. no mos that which is dealt out, fr. ne mein to deal out, distribute. See {Numb}, {Nomad}, and cf. {Numerate}, {Numero}, {Numerous}.] 1. That which admits of being… … The Collaborative International Dictionary of English
abundant number — noun : an imperfect number that is less than the sum of all its divisors (as 12) * * * Math. a positive number that is less than the sum of all positive integers that are submultiples of it, as 12, which is less than the sum of 1, 2, 3, 4, and 6 … Useful english dictionary
abundant number — Imperfect Im*per fect, a. [L. imperfectus: pref. im not + perfectus perfect: cf. F imparfait, whence OE. imparfit. See {Perfect}.] 1. Not perfect; not complete in all its parts; wanting a part; deective; deficient. [1913 Webster] Something he… … The Collaborative International Dictionary of English
abundant number — noun A number that is less than the sum of all of its divisors except itself. The factors of 30 are 1, 2, 3, 5, 6, 10, 15 and 30, and 1 + 2 + 3 + 5 + 6 + 10 + 15 = 42, which is greater than 30, so 30 is an abundant number. Syn: excessive number … Wiktionary
abundant number — Math. a positive number that is less than the sum of all positive integers that are submultiples of it, as 12, which is less than the sum of 1, 2, 3, 4, and 6. Cf. deficient number, perfect number. * * * … Universalium
Colossally abundant number — In mathematics, a colossally abundant number (sometimes abbreviated as CA) is a natural number that, in some rigorous sense, has a lot of divisors. Formally, a number n is colossally abundant if and only if there is an ε > 0 such… … Wikipedia
Highly abundant number — In mathematics, a highly abundant number is a natural number where the sum of its divisors (including itself) is greater than the sum of the divisors of any natural number less than it.Highly abundant numbers and several similar classes of… … Wikipedia
Abundant — A*bun dant, a. [OE. (h)abundant, aboundant, F. abondant, fr. L. abudans, p. pr. of abundare. See {Abound}.] Fully sufficient; plentiful; in copious supply; followed by in, rarely by with. Abundant in goodness and truth. Exod. xxxiv. 6. [1913… … The Collaborative International Dictionary of English
Number — Num ber (n[u^]m b[ e]r), n. [OE. nombre, F. nombre, L. numerus; akin to Gr. no mos that which is dealt out, fr. ne mein to deal out, distribute. See {Numb}, {Nomad}, and cf. {Numerate}, {Numero}, {Numerous}.] 1. That which admits of being counted … The Collaborative International Dictionary of English

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