Sorry, an error occurred while loading the content.

• super_pseudoprime is not  a superpoulet A super-pseudoprime (to base b) : is a pseudoprime to base b whose composite divisors are again pseudoprimes to base
Message 1 of 2 , Sep 30, 2009
View Source
• 0 Attachment
super_pseudoprime is not  a superpoulet

A super-pseudoprime (to base b) : is a pseudoprime to base b whose composite divisors are again pseudoprimes to base b, and which is not a semiprime (so that it has at least one composite proper divisor).

superpolet is
A super-Poulet number is a Poulet number whose every divisor d divides
2d − 2..

[Non-text portions of this message have been removed]
• ... It follows that every Super Poulet that is not a semiprime is *indeed* a super-pseudoprime in base 2. David
Message 2 of 2 , Sep 30, 2009
View Source
• 0 Attachment
Lio David <maths_forall@...> chose to define:

> A super-pseudoprime (to base b) is a pseudoprime to base b whose
> composite divisors are again pseudoprimes to base b, and which is
> not a semiprime

> A super-Poulet number is a Poulet number whose
> every divisor d divides 2^d - 2.

It follows that every Super Poulet that is not a semiprime
is *indeed* a super-pseudoprime in base 2.

David
Your message has been successfully submitted and would be delivered to recipients shortly.