Re: Possible approach to the Goldbach conjecture
- From: "Nico Benschop" <n.benschop-at-chello.nl>
- Date: Thu, 22 Feb 2007 10:20:09 +0100
If you're interested in proving the Goldbach conjecture,
have a look at the five times earlier posted entry,
"Short and direct proof of FLT published". It also shows a link
to a paper proving Goldbach by the same method, namely :
First prove Goldbach for residues mod [product of first k primes]
viz: each even residue is the sum of two units, and then extend by
a carry being a multiple a.m_k of modulus m_k where a < p_{k+1},
and prove Goldbach still holds by induction on k. If this holds up,
I'd appreciate a suggestion of where I could publish this proof.
sci.math : (5) 7feb2007
NB: For a short and direct proof of FLT, using base p number
representation (odd prime p exponent in x^p + y^p =/= z^p) see:
http://pc2.iam.fmph.uniba.sk/amuc/_vol74n2.html (pgs 169 - 184)
Method by "residue-and-carry",
also applied to prove Goldbach's conjecture, see:
http://de.arxiv.org/abs/math.GM/0103091 (16 pgs)
http://home.iae.nl/users/benschop/ng-abstr.htm (10 pgs) <<==
Intro "Why difficult when easy?" , the residue-and-carry method :
at http://home.iae.nl/users/benschop/residu-carry.doc
-----
Nico Benschop, Geldrop (NL) ------- Amspade Research ------
.
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- Possible approach to the Goldbach conjecture
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- Possible approach to the Goldbach conjecture
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