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#54 by Michel Marcus at Sat Feb 29 06:46:31 EST 2020
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#53 by Joerg Arndt at Sat Feb 29 06:25:59 EST 2020
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#52 by Hugo Pfoertner at Sat Feb 29 05:28:01 EST 2020
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#51 by Hugo Pfoertner at Sat Feb 29 05:23:49 EST 2020
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| AUTHOR
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_Helmut Richter__, Dec 11 1999
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Discussion
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Sat Feb 29
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| Hugo Pfoertner: The link to P. Montgomery's article pointed to a related publication. I added this. Sadly, Peter Montgomery passed away on February 18, 2020. https://en.wikipedia.org/wiki/Peter_Montgomery_(mathematician)
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#50 by Hugo Pfoertner at Sat Feb 29 05:19:21 EST 2020
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| COMMENTS
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No further terms below 71.74172*10^1314 (as of Feb 2020, cf. Fischer's table).
56598313 was announced in the paper by Brillhart et al. - . - _Helmut Richter (richter(AT)lrz.de), _, May 17 2004
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| AUTHOR
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Helmut Richter (richter(AT)lrz.de)
Helmut Richter
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#49 by Hugo Pfoertner at Sat Feb 29 05:01:20 EST 2020
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| LINKS
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P. L. MontgomeryWilfrid Keller and Jörg Richstein, <a href="httphttps://dx.doi.org/10.1090/S0025-5718-04-01666-7">New solutionsSolutions of the congruence a^^(p-1 == ) == 1 (mod p^2r)</a>, Math. Comp., 61. 74 (2032005), 361927-363936.
Peter L. Montgomery, <a href="https://doi.org/10.1090/S0025-5718-1993-1182246-5">New solutions of a^(p-1) == 1 (mod p^2)</a>, Math. Comp. 61 (1993), 361-363.
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| STATUS
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approved
editing
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#48 by Michel Marcus at Sat Apr 27 05:39:29 EDT 2019
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#47 by Michel Marcus at Sat Apr 27 05:39:26 EDT 2019
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| LINKS
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Amir Akbary and Sahar Siavashi, <a href="http://math.colgate.edu/~integers/s3/s3.Abstract.html">The Largest Known Wieferich Numbers</a>, INTEGERS, 18(200182018), A3. See Table 1 p. 5.
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| STATUS
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approved
editing
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#46 by Susanna Cuyler at Thu Apr 25 13:28:48 EDT 2019
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#45 by Michel Marcus at Thu Apr 25 10:40:12 EDT 2019
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