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2019-05-05, 21:16
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#1 |
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Einyen
Dec 2003
Denmark
2·1,669 Posts |
Composite PRP
What is the largest PRP (by any PRP test) known to be composite? Except the trivial cases like: Any Mersenne number is a 2-PRP.
The largest one I can think of is this: 3,317,044,064,679,887,385,961,981 which is SPRP to the first 13 prime bases: 2 to 41 https://en.wikipedia.org/wiki/Miller...primality_test https://arxiv.org/abs/1509.00864 If we find a Mersenne Prime candidate with a single 3-PRP test on a lets say 90M exponent, what is the probability it is prime and the probability it is composite? Last fiddled with by ATH on 2019-05-05 at 21:17 |
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2019-05-05, 21:23
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#2 |
Sep 2003
258710 Posts |
If we ever actually find a Mersenne number that is 3-PRP but composite, that will be a much bigger deal than merely finding another ho-hum Mersenne prime.
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2019-05-05, 21:38
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#3 | |
"Rashid Naimi"
Oct 2015
Remote to Here/There
8DA16 Posts |
Quote:
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2019-05-05, 21:40
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#4 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
100110100010002 Posts |
There was this one - 1024 · 31877301 + 1.
An excellent PRP in many bases, resisted to be proven (returned 'composite'; and even was removed from the UTM list as a composite), but that helped to find a bug. It was prime, after all. |
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2019-05-06, 03:22
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#5 | |
Jun 2015
Vallejo, CA/.
11×101 Posts |
Quote:
Löh and Niebuhr in 1992 found some very large Carmichael numbers, including one with 1,101,518 factors and over 16 million digits. Quote:
If that is the case it is easier to go by the trial division route. |
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2019-05-06, 03:42
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#6 |
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"Rashid Naimi"
Oct 2015
Remote to Here/There
2×11×103 Posts |
Here is their paper:
A new algorithm for constructing large Carmichael numbers https://www.semanticscholar.org/pape...e792bc3eb6f90a I assume (without having read the paper) that they construct the numbers by multiplying the prime factors together, which in turn gives the astronomically high number of factor combinations. |
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2019-05-06, 03:45
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#7 | |
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Jun 2015
Vallejo, CA/.
11×101 Posts |
Quote:
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2019-05-06, 04:07
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#8 | |
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"Rashid Naimi"
Oct 2015
Remote to Here/There
2×11×103 Posts |
Quote:
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2019-05-06, 11:04
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#9 | |
"Robert Gerbicz"
Oct 2005
Hungary
112×13 Posts |
Quote:
Code:
(13:03) gp > n=4142384337001350354048000*2^3000+85926168257054400*2^2000+530295120*2^1000+1; (13:03) gp > isprime(n) %36 = 0 (13:03) gp > lift(Mod(2,n)^n) %37 = 2 (13:03) gp > lift(Mod(3,n)^n) %38 = 3 (13:03) gp > lift(Mod(5,n)^n) %39 = 5 (13:03) gp > lift(Mod(7,n)^n) %40 = 7 (13:03) gp > |
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2019-05-07, 14:41
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#10 |
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Just call me Henry
"David"
Sep 2007
Liverpool (GMT/BST)
599010 Posts |
Carmichael numbers are too easy. What is the largest non-Carmichael number that is known to be b-prp?
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2019-05-07, 15:28
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#11 | |
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Einyen
Dec 2003
Denmark
2×1,669 Posts |
Quote:
Last fiddled with by ATH on 2019-05-07 at 15:28 |
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