Quote:
Originally Posted by MattcAnderson
Attached are probably my last efforts on prime constellation mathematics.

Please try to do a little bit more math,
the polynomial f(n)=n²+n+41 has the discriminant b²4ac=163 if you consider f(n)=an²+bn+c,
therefore you could also use the polynomial f(n)=n²+163 with the same discriminant
all primes with pf(n) "appear" double periodically and can be sieved out by division.
If you are looking for some other quadratic polynomial my website may help you, especially
http://devalco.de/poly_sec.php and
for the special polynomial f(n)=n²+163
http://devalco.de/basic_polynomials/...?a=1&b=0&c=163
I hope you will find some new ideas.
Greetings from the quadratic polynomials
Bernhard