Difference between revisions of "Sum of divisors"
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\sigma_k(n) = \sum_{d | n} d^k \ . | \sigma_k(n) = \sum_{d | n} d^k \ . | ||
$$ | $$ | ||
− | so that $\sigma = \sigma_1$ and the number of divisors function $\tau = \sigma_0$. | + | so that $\sigma = \sigma_1$ and the [[number of divisors]] function $\tau = \sigma_0$. |
These are [[multiplicative arithmetic function]]s with [[Dirichlet series]] | These are [[multiplicative arithmetic function]]s with [[Dirichlet series]] | ||
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$$ | $$ | ||
− | The average order of $\sigma(n)$ is given by | + | The [[Average order of an arithmetic function|average order]] of $\sigma(n)$ is given by |
$$ | $$ | ||
\sum_{n \le x} \sigma(n) = \frac{\pi^2}{12} x^2 + O(x \log x) \ . | \sum_{n \le x} \sigma(n) = \frac{\pi^2}{12} x^2 + O(x \log x) \ . | ||
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There are a number of well-known classes of number characterised by their divisor sums. | There are a number of well-known classes of number characterised by their divisor sums. | ||
− | A ''[[perfect number]]'' $n$ is the sum of its [[aliquot divisor]]s (those divisors other than $n$ itself), so $\sigma(n) = 2n$. The even perfect numbers are characterised in terms of [[Mersenne prime]]s $P = 2^p-1$ as $n = 2^{p-1}.P$: it is not known if there are any odd perfect numbers. An ''[[almost perfect number]]'' $n$ similarly has the property that $\sigma(n) = 2n-1$: these include the powers of 2. A ''quasiperfect number'' is defined by $\sigma(n) = 2n+1$: it is | + | A ''[[perfect number]]'' $n$ is the sum of its [[aliquot divisor]]s (those divisors other than $n$ itself), so $\sigma(n) = 2n$. The even perfect numbers are characterised in terms of [[Mersenne prime]]s $P = 2^p-1$ as $n = 2^{p-1}.P$: it is not known if there are any odd perfect numbers. An ''[[almost perfect number]]'' $n$ similarly has the property that $\sigma(n) = 2n-1$: these include the powers of 2. A ''quasiperfect number'' is defined by $\sigma(n) = 2n+1$: it is not known if any exists. See also [[Descartes number]]. |
====References==== | ====References==== | ||
− | * Kishore, Masao. "On odd perfect, quasiperfect, and odd almost perfect numbers". Mathematics of Computation '''36''' (1981) 583–586. | + | * Kishore, Masao. "On odd perfect, quasiperfect, and odd almost perfect numbers". Mathematics of Computation '''36''' (1981) 583–586. {{ZBL|0472.10007}} |
− | * G. Tenenbaum, ''Introduction to Analytic and Probabilistic Number Theory'', Cambridge Studies in Advanced Mathematics '''46''', Cambridge University Press (1995) ISBN 0-521-41261-7 {{ZBL|0831.11001}} | + | * G. Tenenbaum, ''Introduction to Analytic and Probabilistic Number Theory'', Cambridge Studies in Advanced Mathematics '''46''', Cambridge University Press (1995) {{ISBN|0-521-41261-7}} {{ZBL|0831.11001}} |
Latest revision as of 19:41, 17 November 2023
2020 Mathematics Subject Classification: Primary: 11A25 Secondary: 11A51 [MSN][ZBL]
of a natural number $n$
The sum of the positive integers divisors of a natural number $n$, including $1$ and $n$: $$ \sigma(n) = \sum_{d | n} d \ . $$ More generally, the function $\sigma_k$ is defined as $$ \sigma_k(n) = \sum_{d | n} d^k \ . $$ so that $\sigma = \sigma_1$ and the number of divisors function $\tau = \sigma_0$.
These are multiplicative arithmetic functions with Dirichlet series $$ \sum_{n=1}^\infty \sigma_k(n) n^{-s} = \prod_p \left({(1-p^{-s})(1-p^{k-s}) }\right)^{-1} = \zeta(s) \zeta(s-k)\ . $$
The average order of $\sigma(n)$ is given by $$ \sum_{n \le x} \sigma(n) = \frac{\pi^2}{12} x^2 + O(x \log x) \ . $$
There are a number of well-known classes of number characterised by their divisor sums.
A perfect number $n$ is the sum of its aliquot divisors (those divisors other than $n$ itself), so $\sigma(n) = 2n$. The even perfect numbers are characterised in terms of Mersenne primes $P = 2^p-1$ as $n = 2^{p-1}.P$: it is not known if there are any odd perfect numbers. An almost perfect number $n$ similarly has the property that $\sigma(n) = 2n-1$: these include the powers of 2. A quasiperfect number is defined by $\sigma(n) = 2n+1$: it is not known if any exists. See also Descartes number.
References
- Kishore, Masao. "On odd perfect, quasiperfect, and odd almost perfect numbers". Mathematics of Computation 36 (1981) 583–586. Zbl 0472.10007
- G. Tenenbaum, Introduction to Analytic and Probabilistic Number Theory, Cambridge Studies in Advanced Mathematics 46, Cambridge University Press (1995) ISBN 0-521-41261-7 Zbl 0831.11001
Sum of divisors. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Sum_of_divisors&oldid=35556