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2020-12-02, 16:26   #7
sweety439

"99(4^34019)99 palind"
Nov 2016
(P^81993)SZ base 36

22×3×7×37 Posts

Quote:
 Originally Posted by kar_bon Previous is a double post from your own thread!
Yes, I want to let more people know this conjecture, as Riemann hypothesis and abc conjecture and Schinzel's hypothesis H

This conjecture would imply all Sierpinski conjectures and Riesel conjectures in CRUS to every base b>=2, also the dual Sierpinski conjecture (whether 78557 is the smallest odd number k such that 2^n+k is composite for all n>=1) and the dual Riesel conjecture (whether 509203 is the smallest odd number k such that |2^n-k| is composite for all n>=1), and also imply there are infinitely many such primes:

* Mersenne primes
* Fermat primes
* Generalized repunit primes (b^n-1)/(b-1) to every base b>=2 not of the form m^r with r>1
* Generalized nega-repunit primes (b^n+1)/(b+1) to every base b>=2 not of the form m^r with odd r>1 and not of the form 4*m^4 with integer m
* Generalized Fermat primes b^(2^n)+1 to every even base b>=2 not of the form m^r with odd r>1
* Generalized half Fermat primes (b^(2^n)+1)/2 to every odd base b>=2 not of the form m^r with odd r>1
* Williams primes of the 1st kind (b-1)*b^n-1 to every base b>=2
* Williams primes of the 2nd kind (b-1)*b^n+1 to every base b>=2 (not always true if b-1 is of the form m^r with odd r>1 or of the form 4*m^4 with integer m)
* Williams primes of the 3rd kind (b+1)*b^n-1 to every base b>=2

Last fiddled with by sweety439 on 2020-12-02 at 16:37