Jesse, Quadratic map x -> x^2 over finite fields was studied in the paper
"On the iteration of certain quadratic maps over GF(p)" by T.Vasiga and J.Shallit http://citeseer.ist.psu.edu/629149.html Have you got anything new, compared to what is described in this paper? Regards, Max On Jan 7, 2008 11:00 AM, Jesse Homonnay <[EMAIL PROTECTED]> wrote: > I understand: > > X|n+1 = X|n^2 mod p > > Write the pattern connecting each X|n from the set {1,2,...,p-1} then the > loops of the set i.e those numbers > connecting a ring will be described by p=u*2^k+1 where u is the number of > elements in all rings of this structure. > > example: 13=3*2^2+1 and 1 connects itself obviously and 3 connects 9 wich > reconnects to 3 since > 3^2mod13=9 and 9^2mod13=3 etc... > > hope this clarifies a little... > > 2008/1/7, Mike McCarty <[EMAIL PROTECTED]>: > > > > > Jesse Homonnay wrote: > > > 2002 i found studying at university of Lund Sweden > > > > > > X^2=mod N > > > > This modular equivalence is incomplete. > > > > > where N chosen as prime written out as a whole generative pattern > > actually > > > describes the prime numbers as a generative dynamical system pattern. > > > > I can't put any meaning to this. If you mean that when N is a prime, > > then X^2 has certain properties as a polynomial in the ring of integers > > modulo N, then certainly that's true. It doesn't help much in finding > > primes. > > > > > Mersenne primes are a simple symmetry case ( as well as Fermat primes ) > > > > > > All general identities proven hereby. > > > > This statement seems, erm, somewhat inflated. > > > > > I think this is important > > > > I'm sure you do. However, I don't think you have managed to > > convey what it is to anyone yet. > > > > Mike > > -- > > p="p=%c%s%c;main(){printf(p,34,p,34);}";main(){printf(p,34,p,34);} > > Oppose globalization and One World Governments like the UN. > > This message made from 100% recycled bits. > > You have found the bank of Larn. > > I can explain it for you, but I can't understand it for you. > > I speak only for myself, and I am unanimous in that! > > _______________________________________________ > > Prime mailing list > > [email protected] > > http://hogranch.com/mailman/listinfo/prime > > > _______________________________________________ > Prime mailing list > [email protected] > http://hogranch.com/mailman/listinfo/prime > _______________________________________________ Prime mailing list [email protected] http://hogranch.com/mailman/listinfo/prime
