|
2007-05-18, 13:43
|
#34 | |
"Bob Silverman"
Nov 2003
North of Boston
5×17×89 Posts |
Quote:
May I suggest to all of you who are working on these ideas (e.g. new prime tests for Mersenne/Fermat numbers) that you read the dissertation of Jon Grantham (a former student of Carl Pomerance)????? All of these tests (including the purported new ones) are essentially "the same". You are looking to test a (purported) prime P where either P-1 or P+1 is a power of two. All of these tests are just variations of a more general test that works in GP(P^2). They are just disguised ways of doing exponentiations either in Z/PZ* (the multiplicative sub-group of GF(P^2) whose order is P-1), or in the twisted sub-group. (order P+1). Note that the order of the field GF(P^2) = P^2 - 1 = (P+1)(P-1) so it should not come as a surprise that there is a 'LL type' test for Fermat numbers. You should also read the paper of Eric Bach & J. Shallit in which they extend the P-1 factoring algorithm to *any* cyclotomic polynomial in P (which of course can be used as a generator in GF(p^k) for chosen k) ALL of these efforts should be couched in the general language of the various subgroups of GF(P^k). Indeed, the Lucas-Lehmer type tests can be extended to primes *other* than those for which P-1 = 2^k of P+1 = 2^k. They can be extended to primes for which ANY cyclotomic polynomial in P = 2^k simply by going to higher order finite fields. I would suggest that if you really want to publish this kind of work, that you should totally re-phrase your efforts using (as Grantham did) the Frobenius endomorphisms of the (sub-groups of) the higher degree finite fields. Otherwise, all you are doing is picking out "special cases in disguised form". |
|
|
|
|
2007-05-18, 13:45
|
#35 | |
|
"Bob Silverman"
Nov 2003
North of Boston
5×17×89 Posts |
Quote:
be any faster than Pepin's test? For F_n = 2^2^n + 1, both are going to take 2^n modular multiplications/squarings mod F_n. |
|
|
|
|
|
2007-05-18, 15:01
|
#36 | ||||||
Feb 2004
France
16658 Posts |
Hi Sir,
Quote:
Are you talking of this Grantham ? About the paper of Eric Bach & J. Shallit, do you have a title or a link ? Quote:
If not, you should write such a paper. Open the Ribenboim or the Crandall/Pomerance books: they say that Pépins is for N+1 numbers and LLT for N-1 numbers. Quote:
Same question about: Quote:
Quote:
Quote:
About proving that a Fermat is not prime, I think that some test based on LLT with cycles could speed up the process. Since Fermat numbers with unknown status are so big, probably the method is mainly useful for Mersennes. But, if a way could be found to split the LLT-on-cycles in several independent steps, F33 could be checked in 1 year instead of about 4000. About the conjectures : "S(0)=US, S(i+1)=S(i)^2-2 ; Number is prime if S(some k)==US ". Also, I agree that they (if proved some day) will not speed up anything. But, once proved, it could help to have more people looking at these cycles, and not only at the tree of the DiGraph. Regards, Tony |
||||||
|
|
|
|
2007-05-18, 15:39
|
#37 | |||||||||||
|
"Bob Silverman"
Nov 2003
North of Boston
5×17×89 Posts |
Quote:
Quote:
Quote:
Quote:
Quote:
result; The existence of a single general test that proves that P is prime when psi(P) = 2^k [where psi(P) is an appropriate cyclotomic polynomial in P] is clear from prior work. I don't think that such a general test will improve practical computation and hence (in my opinion) has limited value. The Bach/Shallit extension to the P-1/P+1 factoring method had zero practical use. Quote:
that Carl is aware that the Bach/Shallit work could be used to combine these two tests if he bothers to think about it. Quote:
to learn the general theory of Finite Fields and their structure. I recommend Lidl & Neidereiter's "Finite Fields" it is superb. Quote:
the people whose papers I cited realize it. Quote:
two special purpose factoring algorithms into one, the Lucas & Pepin results can be similarly combined. Quote:
A linear improvement will be useless (i.e. just reducing the number of multiplications by a constant factor) because even the smallest Fermat number of unknown status is SO FAR out of range, that no such improvement will be useful. Quote:
of doing exponentiations in a finite field, but *IN PARALLEL*. Finding a new way to do exponential in parallel would be a fantastic result. But I doubt if one exists. Bottom line: I doubt very strongly that a method can be found to reduce the number of multiplications needed in a LL test for Mersenne Primes *a priori*. **After** testing a given value of M_p, it should be possible to find a shorter certificate, but it will depend on the number being tested. I doubt that there is a "universal" generator with a shorter cycle than we have already. But it doesn't hurt to look for one..... Last fiddled with by ewmayer on 2007-05-21 at 17:02 Reason: fixed quote syntax |
|||||||||||
|
|
|
|
2007-05-18, 18:07
|
#38 | |
Feb 2007
24·33 Posts |
Quote:
However, I strongly believe that it should be "relatively easy" to find (at least statistically) more efficient methods than the LL test for showing NON-primality of (at least some) Mp, which today are tested by GIMPS using the classical LL test. And almost all of GIMPS' work is about showing NON-primality (except for roughly 1 in a million)... And cumulating results on the structure of the LL type proofs could give us some idea of where or what we should look for. |
|
|
|
|
|
2007-05-18, 18:20
|
#39 | |
|
"Bob Silverman"
Nov 2003
North of Boston
11101100011012 Posts |
Quote:
Again, something is happening in disguise. If s^2-4 is a non-residue, then s is in the TWISTED sub-group. If s^2-4 is a residue, then s is in Z/pZ* (so that the order is p-1, not p+1 and hence Pollard p-1 is being run instead of p+1). The reciprocity test tells WHICH subgroup s is in. However, since you don't know p in advance, you just select s at random. It will be in the group of order p+1 half the time. |
|
|
|
|
|
2007-05-18, 21:42
|
#40 | |
|
Feb 2004
France
13·73 Posts |
Quote:
 .About the rest of your comments, thanks. I'll need time to digest them ... T. |
|
|
|
|
|
2007-05-18, 22:37
|
#41 | |
|
Feb 2007
24·33 Posts |
Quote:
E. Bach and J. Shallit. Factoring with cyclotomic polynomials. Math. Comp., 52:201--219, 1989. Available online: http://dx.doi.org/10.2307/2008664 Last fiddled with by m_f_h on 2007-05-18 at 22:43 Reason: added web link |
|
|
|
|
|
2014-07-22, 07:31
|
#42 |
|
Jul 2014
Montenegro
2610 Posts |
|
|
|
|
|
2014-07-23, 12:40
|
#43 | |
|
"Bob Silverman"
Nov 2003
North of Boston
1D8D16 Posts |
Quote:
as if the content of the paper discusses PROVED results. It should be titled: CONJECTURED Primality Criteria for Specific Classes of Proth Numbers Proth numbers are easy to prove prime anyway because the full factorization of N-1 follows immediately from the form of the number. Even if the above conjectures are true, they add very little to the practical art for proving Proth numbers are prime. |
|
|
|
|
|
2014-07-23, 15:31
|
#44 | |
|
(loop (#_fork))
Feb 2006
Cambridge, England
2×7×461 Posts |
Quote:
|
|
|
|
|
 |
Similar Threads
|
||||
| Thread | Thread Starter | Forum | Replies | Last Post |
| Pépin tests of Fermat numbers beyond F24 | ewmayer | Computer Science & Computational Number Theory | 89 | 2023-06-02 22:21 |
| Use Pepin's Tests for proving primality of Mersenne numbers ? | T.Rex | Math | 12 | 2016-04-03 22:27 |
| Proof of Primality Test for Fermat Numbers | princeps | Math | 15 | 2012-04-02 21:49 |
| The fastest primality test for Fermat numbers. | Arkadiusz | Math | 6 | 2011-04-05 19:39 |
| Two Primality tests for Fermat numbers | T.Rex | Math | 2 | 2004-09-11 07:26 |
