Anyone know the congruence from A001915?
Joe Crump
joecr at microsoft.com
Mon Dec 11 23:44:08 CET 2000
FYI: Sequence appears to be:
"Prime p such that the congruence 2^x = 3 (mod p) is solvable."
or atleast it agrees with the terms. I submitted a comment
to update if this is correct. If anyone has access to the
reference, I'd be interested in knowing if there is a
different meaning for comparison.
Take care!
- Joe K. Crump (joecr at microsoft.com)
-----Original Message-----
From: Joe Crump [mailto:joecr at microsoft.com]
Sent: Thursday, December 07, 2000 2:30 PM
To: N. J. A. Sloane; seqfan at ext.jussieu.fr
Subject: Anyone know the congruence from A001915?
Hi,
Can someone tell me what congruence the following
sequence refers to?
-----------------------------------------------------------
Sequence: 5,11,13,19,23,29,37,47,53,59,61,67,71,83,97,101,107,131,139,
149,163,167,173,179,181,191,193,197,211,227,239,263,269,293,
307,311,313,317
Name: Solution of a congruence.
References M. Kraitchik, Recherches sur la Th\'{e}orie des Nombres.
Gauthiers-Villars, Paris, Vol. 1, 1924, Vol. 2, 1929, see Vol.
1, p. 63.
Keywords: nonn
Offset: 1
Author(s): njas
-----------------------------------------------------------
Thanks!
- Joe K. Crump (joecr at microsoft.com)
-----Original Message-----
From: N. J. A. Sloane [mailto:njas at research.att.com]
Sent: Thursday, December 07, 2000 12:43 PM
To: seqfan at ext.jussieu.fr
Subject: future projects
i've made a list of things that need doing - see
www.research.att.com/~njas/sequences/future.html
- in case anyone wants to help
the page is still under construction and i expect to
expand it in the next few days
it is linked to from the "About the On-Line Encyclopedia"
page in case you forget where it is.
NJAS
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