Fermat pseudoprime

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A composite number ${\displaystyle q\ }$ is called Fermat pseudoprime to a natural base ${\displaystyle a\ }$, coprime to ${\displaystyle q\ }$, so that ${\displaystyle a^{q-1}\equiv 1{\pmod {q}}}$

Restriction

It is sufficient, that the base ${\displaystyle a\ }$ satisfy ${\displaystyle 2\leq a\leq q-2}$ because every odd number ${\displaystyle q\ }$ satisfy for ${\displaystyle a=q-1\ }$ that ${\displaystyle a^{q-1}\equiv 1{\pmod {q}}}$^[1]

If ${\displaystyle q\ }$ is a Fermat pseudoprime to base ${\displaystyle a\ }$, then ${\displaystyle n\ }$ is a Fermat pseudoprime to base ${\displaystyle b\cdot q+a}$ for every integer ${\displaystyle b\geq 0}$

Odd Fermat pseudoprimes

To every odd Fermat pseudoprime ${\displaystyle \scriptstyle q\ }$ exist an even number of bases ${\displaystyle \scriptstyle a\ }$. Every base ${\displaystyle \scriptstyle a\ }$ has a cobase ${\displaystyle \scriptstyle a'=q-a\ }$

Examples

15 is a Fermat pseudoprime to the bases 4 and 15

49 is a Fermat pseudoprime to the bases 18, 19, 30 and 31

Properties

Most of the Pseudoprimes, like Euler pseudoprime, Carmichael number, Fibonacci pseudoprime and Lucas pseudoprime, are Fermat pseudoprimes.

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