Carmichael number: Difference between revisions
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A '''Carmichael number''' is a composite number, who is named after the mathematician [[Robert Daniel Carmichael]]. A Carmichael number <math>\scriptstyle c\ </math> satisfies for every integer <math>\scriptstyle a\ </math>, that <math>\scriptstyle a^c - a\ </math> is divisible by <math>\scriptstyle c\ </math>. A Carmichael number ''c'' satisfies also the conrgruence <math>\scriptstyle a^{c-1} \equiv 1 \pmod c</math>, if <math>\scriptstyle \operatorname{gcd}(a,c) = 1</math>. In 1994 Pomerance, Alford and Granville proved that there exist infinitely many Carmichael numbers. | A '''Carmichael number''' is a composite number, who is named after the mathematician [[Robert Daniel Carmichael]]. A Carmichael number <math>\scriptstyle c\ </math> satisfies for every integer <math>\scriptstyle a\ </math>, that <math>\scriptstyle a^c - a\ </math> is divisible by <math>\scriptstyle c\ </math>. A Carmichael number ''c'' satisfies also the conrgruence <math>\scriptstyle a^{c-1} \equiv 1 \pmod c</math>, if <math>\scriptstyle \operatorname{gcd}(a,c) = 1</math>. In 1994 Pomerance, Alford and Granville proved that there exist infinitely many Carmichael numbers. | ||
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* [[Richard E. Crandall]] and [[Carl Pomerance]]: Prime Numbers. A Computational Perspective. Springer Verlag, ISBN 0-387-25282-7 | * [[Richard E. Crandall]] and [[Carl Pomerance]]: Prime Numbers. A Computational Perspective. Springer Verlag, ISBN 0-387-25282-7 | ||
* [[Paolo Ribenboim]]: The New Book of Prime Number Records. Springer Verlag, 1996, ISBN 0-387-94457-5 | * [[Paolo Ribenboim]]: The New Book of Prime Number Records. Springer Verlag, 1996, ISBN 0-387-94457-5 | ||
Revision as of 07:27, 7 December 2007
A Carmichael number is a composite number, who is named after the mathematician Robert Daniel Carmichael. A Carmichael number satisfies for every integer , that is divisible by . A Carmichael number c satisfies also the conrgruence , if . In 1994 Pomerance, Alford and Granville proved that there exist infinitely many Carmichael numbers.
Properties of a Carmichael number
- Every Carmichael number is squarefree and has at least three different prime factors
- For every Carmichael number c is true, that is divisible by for every of its prime factors .
- Every Carmichael number is an Euler pseudoprime.
- Every absolute Euler pseudoprime is a Carmichael number.
Chernicks Carmichael numbers
J. Chernick found in 1939 a way to construct Carmichael numbers[1]. If, for a natural number n, the three numbers , and are prime numbers, the product is a Carmichael number. Equivalent to this is that if , and are prime numbers, then the product is a Carmichael number.
References and notes
Further reading
- Richard E. Crandall and Carl Pomerance: Prime Numbers. A Computational Perspective. Springer Verlag, ISBN 0-387-25282-7
- Paolo Ribenboim: The New Book of Prime Number Records. Springer Verlag, 1996, ISBN 0-387-94457-5