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2022-01-24, 18:16
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#12 |
Feb 2017
Nowhere
16CC16 Posts |
Let us not forget the numbers that have changed status.
Fermat (letters, 1630's - 1640's) claimed that all numbers 2^(2n) + 1 were prime. Thus, 232 + 1 changed from prime to composite (Euler, 1732; published 1738) Mersenne claimed 2p - 1 was prime (at least for p ≤ 257) when p = 2, 3, 5, 7, 13, 17, 19, 31, 67, 127, 257. Thus, 261 -1 changed from composite to prime (Peruvshin, 1883) 267 - 1 changed from prime to composite (Cole, 1903) etc |
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2022-01-24, 19:54
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#13 | |
Jun 2015
Vallejo, CA/.
2×3×5×37 Posts |
Quote:
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2022-01-24, 19:55
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#14 |
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Jun 2021
2·52 Posts |
prime numbers boring. take a look into prime angles
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2022-01-24, 21:07
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#15 | |
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Feb 2017
Nowhere
22·1,459 Posts |
Quote:
A PRP is generally understood to mean any integer greater than 1 that does not test as composite to some base(s) with a Fermat (or Euler or Miller-Rabin) test, while a "pseudoprime" is generally understood to mean a composite number that does not so test as composite. I don't know about "assumed to be prime because they tested as PRP's but then proved composite." I don't know of any examples offhand. There might be "mundane" examples of numbers that individual users of some software package assumed to be prime because it tested as a PRP with the package's test, but later proved to be composite. I note that though a Carmichael number n is guaranteed to test PRP by a Fermat test to any base prime to n, it may well be revealed as composite by a Miller-Rabin test. In such a case, Miller-Rabin provides a square root of 1 other than 1 or -1, hence a proper factorization. For example, Mod(2,561)^560 and Mod(2,561)^280 are both Mod(1,561), but Mod(2,560)^140 = Mod(67,561). Then gcd(67-1,561) = 33 and gcd(67+1,561) 17 are proper factors. There are, however, ways of constructing numbers which are the product of two prime numbers, that will test as PRP's by Miller-Rabin to any given finite set of (usually prime) bases. But who knows? The next Mp that tests PRP to base 3 may be proven composite by an LL test. |
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2022-01-24, 21:28
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#16 |
Sep 2002
Database er0rr
11×383 Posts |
https://primes.utm.edu/notes/proofs/a_pseudoprimes.html shows how to construct base-a pseudoprimes.
https://www.fq.math.ca/Scanned/41-4/chen.pdf and https://www.d.umn.edu/~jgreene/baillie/Baillie-PSW.html supposedly shows how to construct BPSW pseudoprimes http://pseudoprime.com/dopo.pdf Pomerance argues for the infintude of BPSW pseudoprimes. More at: https://en.wikipedia.org/wiki/Bailli...est#References Last fiddled with by paulunderwood on 2022-01-24 at 21:29 |
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2022-01-24, 21:33
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#17 | |
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Jun 2015
Vallejo, CA/.
2×3×5×37 Posts |
Quote:
Yes, I messed up when using the word pseudoprime. What I meant was along he line of a number that after many tests and varied approaches is indistinguishable from a true PRP but is eventually found to be composite. I.e pseudoprime. I had read somewhere of this but I can’t remember where. |
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2022-01-30, 04:48
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#18 | |
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Romulan Interpreter
"name field"
Jun 2011
Thailand
997310 Posts |
Quote:
 I mean, if so many big guys made mistakes... 
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