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Topic: Vindication of Goldbach's conjecture
Replies: 74   Last Post: Aug 9, 2012 6:50 PM

 Messages: [ Previous | Next ]
 J. Antonio Perez M. Posts: 2,736 Registered: 12/13/04
Re: Vindication of Goldbach's conjecture
Posted: Jun 20, 2012 11:44 AM

On Jun 14, 12:28 pm, mluttgens <lutt...@gmail.com> wrote:
> On 10 juin, 00:20, rich...@cogsci.ed.ac.uk (Richard Tobin) wrote:
>

>
> > mluttgens  <lutt...@gmail.com> wrote:
> > >[deleted]
>
> > You refuse to address the question; I conclude you are a troll.
>
> > -- Richard
>
> My response is contained in the following new version:
>
> Vindication of Goldbach's conjecture
> ______________________________
>
> According to the conjecture, every even integer greater than 4 can be
> expressed as the sum of two primes.
>
> Let's consider two identical infinite series S and S' of uneven
> numbers, where S and S' = 3, 5, 7, 9, 11, 13, etc...
> In other words, S(n) = S'(n) = 2n +1, with n beginning at 1.
> Let?s note that S and S? contain only natural numbers.
>
> The fact that some uneven numbers contained in the series S and S' can
> be
> the result of mathematical operations, for instance exponentiation, is
> thus irrelevant.
>
> By adding successively each number of S to all the numbers of S', one
> gets a series P of even numbers.
>
> Example:
> _______
>
> n     S    S'
> _     _    _
>
> 1     3    3
> 2     5    5
> 3     7    7
> 4     9    9
> 5    11   11
> 6    13   13
> 7    15   15
> 8    17   17
> 9    19   19
> 10   21   21
> 11   23   23
>
> By adding, one gets the following even numbers of series P:
>
> From S = 3:            6, 8, 10, 12, 14, 16, 18, 20, 22, 24, 26
> From S = 5:            8, 10, 12, 14, 16, 18, 20, 22, 24, 26, 28
> From S = 7:          10, 12, 14, 16, 18, 20, 22, 24, 26, 28, 30
> From S = 9:          12, 14, 16, 18, 20, 22, 24, 26, 28, 30, 32
> From S = 11:        14, 16, 18, 20, 22, 24, 26, 28, 30, 32, 34
> From S = 13:        16, 18, 20, 22, 24, 26, 28, 30, 32, 34, 36
> From S = 15:        18, 20, 22, 24, 26, 28, 30, 32, 34, 36, 38
> From S = 17:        20, 22, 24, 26, 28, 30, 32, 34, 36, 38, 40
> From S = 19:        22, 24, 26, 28, 30, 32, 34, 36, 38, 40, 42
> From S = 21:        24, 26, 28, 30, 32, 34, 36, 38, 40, 42, 44
> From S = 23:        26, 28, 30, 32, 34, 36, 38, 40, 42, 44, 46
>
> Thus, series P contains all the even numbers from 6 to 46.
>
> In P, the number 26 = 3+23, 5+21, 7+19, 9+17, 11+15, 13+13, 15+11,
> 17+9, 19+7, 21+5 and 23+3, all the terms coming from the  successive
> uneven numbers of S and S' from 3 to 23, where 23 = 26 - 3.
> As S and S' contain all the prime numbers inferior or equal to 26-3 ,
> the even number 26 is necessarily the sum of two primes.
> Let?s note that it is not necessary to indentify those primes. Knowing
> that they exist in S and S? is enough..
> This applies mutatis mutandi to any even integer
>
> Conclusion:
>
> Every even integer greater than 4 can be expressed as the sum of two
> primes.
> In other words, the above procedure vindicates Goldbach's conjecture.
>
> Marcel Luttgens
>
> (June 11, 2012)
>
>

Aah, I've already understood!! "Vindication" is Luttgens's word for
"stupidities pucked by
a non-mathematician about some mathematical subject he knows nothing

Indeed, Marcel has vindicated, indicated and vindicted GB....he hasn't
proved it, of course,
nor has he ever claimed so.

Good!

Date Subject Author
6/6/12 mluttgens
6/6/12 Brian Q. Hutchings
6/6/12 GEIvey
6/7/12 Richard Tobin
6/8/12 mluttgens
6/8/12 Count Dracula
6/9/12 mluttgens
6/9/12 Brian Q. Hutchings
6/9/12 mluttgens
6/25/12 GEIvey
6/9/12 Richard Tobin
6/9/12 mluttgens
6/9/12 Richard Tobin
6/9/12 Brian Q. Hutchings
6/9/12 Brian Q. Hutchings
6/14/12 mluttgens
6/16/12 mluttgens
6/16/12 Frederick Williams
6/20/12 mluttgens
6/20/12 Rick Decker
6/21/12 mluttgens
6/21/12 Frederick Williams
6/21/12 mluttgens
6/22/12 mluttgens
6/22/12 mluttgens
6/22/12 Brian Q. Hutchings
6/25/12 Michael Stemper
6/26/12 mluttgens
6/26/12 Frederick Williams
6/28/12 Michael Stemper
7/19/12 mluttgens
7/19/12 Timothy Murphy
7/19/12 mluttgens
7/19/12 Gus Gassmann
7/20/12 mluttgens
8/1/12 Tim Little
8/4/12 mluttgens
8/4/12 Frederick Williams
8/6/12 mluttgens
8/6/12 gus gassmann
8/6/12 Brian Q. Hutchings
8/9/12 Pubkeybreaker
7/19/12 J. Antonio Perez M.
7/20/12 mluttgens
6/25/12 Michael Stemper
6/25/12 Thomas Nordhaus
6/17/12 mluttgens
6/17/12 quasi
6/18/12 Count Dracula
6/18/12 quasi
6/19/12 Count Dracula
6/19/12 quasi
6/20/12 mluttgens
6/22/12 Michael Stemper
6/22/12 mluttgens
6/22/12 Robin Chapman
6/22/12 Michael Stemper
6/23/12 mluttgens
6/22/12 Richard Tobin
6/22/12 Richard Tobin
6/25/12 Richard Tobin
6/25/12 Michael Stemper
6/14/12 Count Dracula
6/21/12 Luis A. Rodriguez
6/21/12 Brian Q. Hutchings
6/21/12 mluttgens
6/25/12 GEIvey
6/20/12 J. Antonio Perez M.