Difference between revisions of "Carmichael number"
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| − | A composite natural number | + | A composite natural number $n$ for which $a^{n-1} \equiv 1$ modulo $n$ whenever $a$ is relatively prime to $n$. Thus they are pseudo-primes (cf. [[Pseudo-prime|Pseudo-prime]]) for every such base $a$. These numbers play a role in the theory of probabilistic primality tests (cf. [[Probabilistic primality test|Probabilistic primality test]]), as they show that Fermat's theorem, to wit $ a^p \equiv a $ modulo $p$, whenever $p$ is prime and $a \not\equiv 0$ modulo $p$, is not a sufficient criterion for primality (cf. also [[Fermat little theorem|Fermat little theorem]]). |
The first five Carmichael numbers are | The first five Carmichael numbers are | ||
| − | <table class="eq" style="width:100%;"> <tr><td valign="top" style="width:94%;text-align:center;"> | + | <table class="eq" style="width:100%;"> <tr><td valign="top" style="width:94%;text-align:center;">$561,\ 1105,\ 1729,\ 1905,\ 2047$</td> </tr></table> |
| − | R.D. Carmichael [[#References|[a2]]] characterized them as follows. Let | + | R.D. Carmichael [[#References|[a2]]] characterized them as follows. Let $\lambda(n)$ be the exponent of the multiplicative group of integers modulo $n$, that is, the least positive $\lambda$ making all $\lambda$-th powers in the group equal to $1$. (This is readily computed from the prime factorization of $n$.) Then a composite natural number $n$ is Carmichael if and only if $\lambda(n) \mid n-1$. From this it follows that every Carmichael number is odd, square-free, and has at least $3$ distinct prime factors. |
| − | Let | + | Let $C(x)$ denote the number of Carmichael numbers $\le x$. W.R. Alford, A. Granville and C. Pomerance [[#References|[a1]]] proved that $C(x) > x${2/7}$ for sufficiently large $x$. This settled a long-standing conjecture that there are infinitely many Carmichael numbers. It is believed on probabilistic grounds that $\log C() \sim \log x$. [[#References|[a4]]]. |
P. Erdős proved in 1956 that $ C(X) < X.\exp(- k \log X \log\log\log X / \log\log X) $ for some constant $ k $: he also gave a heuristic suggesting that his upper bound should be close to the true rate of growth of $ C(X) $.[[#References|[a5]]] | P. Erdős proved in 1956 that $ C(X) < X.\exp(- k \log X \log\log\log X / \log\log X) $ for some constant $ k $: he also gave a heuristic suggesting that his upper bound should be close to the true rate of growth of $ C(X) $.[[#References|[a5]]] | ||
Revision as of 17:08, 22 February 2013
A composite natural number $n$ for which $a^{n-1} \equiv 1$ modulo $n$ whenever $a$ is relatively prime to $n$. Thus they are pseudo-primes (cf. Pseudo-prime) for every such base $a$. These numbers play a role in the theory of probabilistic primality tests (cf. Probabilistic primality test), as they show that Fermat's theorem, to wit $ a^p \equiv a $ modulo $p$, whenever $p$ is prime and $a \not\equiv 0$ modulo $p$, is not a sufficient criterion for primality (cf. also Fermat little theorem).
The first five Carmichael numbers are
| $561,\ 1105,\ 1729,\ 1905,\ 2047$ |
R.D. Carmichael [a2] characterized them as follows. Let $\lambda(n)$ be the exponent of the multiplicative group of integers modulo $n$, that is, the least positive $\lambda$ making all $\lambda$-th powers in the group equal to $1$. (This is readily computed from the prime factorization of $n$.) Then a composite natural number $n$ is Carmichael if and only if $\lambda(n) \mid n-1$. From this it follows that every Carmichael number is odd, square-free, and has at least $3$ distinct prime factors.
Let $C(x)$ denote the number of Carmichael numbers $\le x$. W.R. Alford, A. Granville and C. Pomerance [a1] proved that $C(x) > x${2/7}$ for sufficiently large $x$. This settled a long-standing conjecture that there are infinitely many Carmichael numbers. It is believed on probabilistic grounds that $\log C() \sim \log x$. [[#References|[a4]]]. P. Erdős proved in 1956 that $ C(X) < X.\exp(- k \log X \log\log\log X / \log\log X) $ for some constant $ k $: he also gave a heuristic suggesting that his upper bound should be close to the true rate of growth of $ C(X) $.[a5]
There is apparently no better way to compute 
than to make a list of the Carmichael numbers up to 
. The most exhaustive computation to date (1996) is that of R.G.E. Pinch, who used the methods of [a3] to determine that 
.
References
| [a1] | W.R. Alford, A. Granville, C. Pomerance, "There are infinitely many Carmichael numbers" Ann. of Math. , 140 (1994) pp. 703–722 |
| [a2] | R.D. Carmichael, "Note on a new number theory function" Bull. Amer. Math. Soc. , 16 (1910) pp. 232–238 (See also: Amer. Math. Monthly 19 (1912), 22–27) |
| [a3] | R.G.E. Pinch, "The Carmichael numbers up to  " Math. Comp. , 61 (1993) pp. 381–391 |
| [a4] | C. Pomerance, J.L. Selfridge, S.S. Wagstaff, Jr., "The pseudoprimes to  " Math. Comp. , 35 (1980) pp. 1003–1026 |
| [a5] | P. Erdős, "On pseudoprimes and Carmichael numbers" Publ. Math. Debrecen', 4 (1956) pp.201–206. |
How to Cite This Entry:
Carmichael number. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Carmichael_number&oldid=29459
Carmichael number. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Carmichael_number&oldid=29459
This article was adapted from an original article by E. Bach (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article