Strong pseudoprime

A strong Pseudoprime is an Euler pseudoprime with a special property:

If a composite Number $\scriptstyle q\$ is factorable in $\scriptstyle q=d\cdot 2^{s}$ , whereby $\scriptstyle d\$ an odd number is, then is $\scriptstyle q\$ a strong Pseudoprime to a base $\scriptstyle a\$ if:

$a^{d}\equiv 1{\pmod {q}}$

or

$a^{d\cdot 2^{r}}\equiv -1{\pmod {q}}$ if $0\leq r<s-1$

The first condition is stronger

Properties

Every strong pseudoprime is also an Euler pseudoprime
Every strong pseudoprime is odd, because every Euler pseudoprime is odd.
If a strong pseudoprime $\scriptstyle q\$ is pseudoprime to a base $\scriptstyle a\$ in $\scriptstyle a^{d}\equiv 1{\pmod {q}}$ , than $\scriptstyle q\$ is pseudoprime to a base $\scriptstyle a'=q-a\$ in $\scriptstyle a'^{d}\equiv -1{\pmod {q}}$ and versa vice.

Links

Table of strong pseudoprimes between 49 and 1393

Strong pseudoprime

Properties

Further reading

Links

Navigation menu

Strong pseudoprime

Properties

Further reading

Links

Navigation menu

Search