## Re: Twin prime conjecture

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• Conjecture:   Let p(n) the nth prime number n 1     There is a twin prime pair between p(n) and p(n+1+Floor[log[n]^ w]   w is a real number    1
Message 1 of 12 , Aug 4, 2012
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Conjecture:

Let p(n) the nth prime number n>1

There is a twin prime pair between p(n) and p(n+1+Floor[log[n]^ w]

w is a real number    1<w< 2

Since we have
Sincerely

Sebastian martin Ruiz

________________________________
De: John <reddwarf2956@...>
Para: Sebastian Martin Ruiz <s_m_ruiz@...>
Enviado: Domingo 5 de agosto de 2012 5:33
Asunto: Re: Twin prime conjecture

Mr. Ruiz,

Why not another number near 2 and related to 2? For example, 2*sqr(2)*log(2) = 1.9605....

--- In primenumbers@yahoogroups.com, Sebastian Martin Ruiz <s_m_ruiz@...> wrote:
>
> I tried experimentalemte many values. I work with MATHEMATICA and modifying the formulas many timesÂ I looking for symmetry, beauty and simplicity. Respect to (2-1/Pi ^ 2) is the best bound that I have found but there may be some other smaller. I do mathÂ proof later whenÂ I can.
>
>
> ________________________________
> De: "whygee@..." <whygee@...>
> Enviado: Jueves 2 de agosto de 2012 22:11
> Asunto: Re: [PrimeNumbers] Twin prime conjecture
>
>
> Â
> Le 2012-08-02 22:07, Sebastian Martin Ruiz a Ã©critÂ :
> > Hello all:
>
> Hello,
>
> > Conjecture:
> > Â
> > Let p(n) the nth prime number n>1
> > Â
> > Â
> > There is a twin prime pair between p(n) and p(n+1+Floor[log[n]^
> > (2-1/Pi^2)])
> > Â
>
> Can you please provide more background ?
> what makes you think this is true, how did you come to this idea ?
>
> > Sincerely
>
> regards
>
>
>
> [Non-text portions of this message have been removed]
>

large lists of twin primes would be interesting to someone with a powerful computer trying to refine the value of wfor  n>n0 sufficiently large.

[Non-text portions of this message have been removed]
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