Euler pseudoprime

A composite number n is called an Euler pseudoprime to a natural base a, if $a^{\frac {n-1}{2}}\equiv 1{\pmod {n}}$ or $a^{\frac {n-1}{2}}\equiv \left(-1\right){\pmod {n}}$

Properties

Every Euler pseudoprime is odd.
Every Euler pseudoprime is also a Fermat pseudoprime:

\left(a^{\frac {n-1}{2}}\right)^{2}=a^{n-1}

and

1^{2}=\left(-1\right)^{2}=1\

Every Euler Pseudoprime to base a, which satisfy $a^{(n-1)/2}\equiv \left({\frac {a}{n}}\right){\pmod {n}}$ is an Euler-Jacobi pseudoprime.
Carmichael numbers and Strong pseudoprimes are Euler pseudoprimes too.

Absolute Euler pseudoprime

An absolute Euler pseudoprime is a composite number c, that satisfies the conrgruence $a^{\frac {c-1}{2}}\equiv 1{\pmod {c}}$ or $a^{\frac {n-1}{2}}\equiv \left(-1\right){\pmod {n}}$ for every base a that is coprime to c. Every absolute Euler pseudoprime is also a Carmichael number.

Euler pseudoprime

Properties

Absolute Euler pseudoprime

Further reading

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Euler pseudoprime

Properties

Absolute Euler pseudoprime

Further reading

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