Carmichael number: Difference between revisions

A Carmichael number is a composite number, who is named after the mathematician Robert Daniel Carmichael. A Carmichael number ${\displaystyle \scriptstyle c\ }$ satisfies for every integer ${\displaystyle \scriptstyle a\ }$, that ${\displaystyle \scriptstyle a^{c}-a\ }$ is divisible by ${\displaystyle \scriptstyle c\ }$. A Carmichael number c satisfies also the conrgruence ${\displaystyle \scriptstyle a^{c-1}\equiv 1{\pmod {c}}}$, if ${\displaystyle \scriptstyle \operatorname {gcd} (a,c)=1}$. 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 ${\displaystyle c-1}$ is divisible by ${\displaystyle p_{n}-1}$ for every of its prime factors ${\displaystyle p_{n}}$.
• 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 ${\displaystyle \scriptstyle 6n+1\ }$, ${\displaystyle \scriptstyle 12n+1\ }$ and ${\displaystyle \scriptstyle 18n+1\ }$ are prime numbers, the product ${\displaystyle \scriptstyle (6n+1)\cdot (12n+1)\cdot (18n+1)}$ is a Carmichael number. Equivalent to this is that if ${\displaystyle \scriptstyle m\ }$, ${\displaystyle \scriptstyle 2m-1\ }$ and ${\displaystyle \scriptstyle 3m-2}$ are prime numbers, then the product ${\displaystyle \scriptstyle m\cdot (2m-1)\cdot (3m-2)}$ 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