meta user
network profile
| bio | website | |
|---|---|---|
| location | Spain , Basque Country , Bilbao | |
| age | ||
| visits | member for | 1 year, 7 months |
| seen | 6 hours ago | |
| stats | profile views | 624 |
i got a degree on Physics and have several ideas on my own , unfortunately i do not have a physics sponsor :) in order to get an investigation grant :)
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Feb 6 |
asked | sum over primes and its powers |
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Feb 4 |
revised |
Theta series and Riemann Hypothesis added 59 characters in body |
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Feb 4 |
asked | Theta series and Riemann Hypothesis |
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Feb 1 |
asked | regularization for an integral. |
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Feb 1 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? thi is not only a trace formula i provide also a HERMITIAN operator whose eigenvalues are the Riemann zeros. |
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Jan 31 |
answered | What is so special about $\alpha=-1$ in the integral of $x^\alpha$? |
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Jan 31 |
comment |
How do I prove convergence of $\sum\limits_{k=1}^\infty \tfrac{\sin k^2}{k}$? anyway.. what if the series does ont converge :) we simply truncate it and that is all, for example the series $ 1/2 + \sum_{n=1}^{\infty}cos(nx) $ does not converge |
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Jan 31 |
comment |
How do I prove convergence of $\sum\limits_{k=1}^\infty \tfrac{\sin k^2}{k}$? integral criterion.. the series will be convergent if the integral $ \int_{1}^{\infty}dx \frac{sin(x^{2})}{x} $ is convergent |
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Jan 30 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? but you can always truncate a divergent series can't you ?? .. also from the potential i have deduced the Riemann weil trace formula |
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Jan 29 |
answered | Riemann Hypothesis: Could there be “simple” ways of getting (partial?) results |
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Jan 29 |
comment |
Is classifying one dimensional generalized quasicrystals worthwhile strategy to approach RH? i think 'NO' .. even if you foudn a system whith the Riemann zeros, it could be that ther are zeros outside the critical line which do ont appear inisd ethe quasycritstal. |
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Jan 29 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? so you mean is false because you are assuming exist an hermitian operator whose trace formula of $ \delta (E-H) $ exists and is equal to the Riemann-weil formula. But is not possible to assume or consider Riemann Hypothesis as an inverse problem ?, for example find an Hermitian operator $ -y''(x)+q(X)y(x) $ whose eigenvalues are the Riemann zeros or similar. |
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Jan 28 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? HERE is a survey made by me about this problem and how the Riemann Weil and gutzwiller trace are analogue :) vixra.org/pdf/1301.0078v2.pdf see the analogy between the Guzwiller trace and riemann weil summation formulae in QM |
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Jan 28 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? the potential is obtained from Riemann-Weil trace formula which is analogue to Gutzwiller's :) |
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Jan 28 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? if we take the fractional derivative operator $ \frac{1}{2\sqrt{\pi}}\frac{d^{1/2}}{dx^{1/2}} $ inside the equation for $ f^{-1}(X) $ you get the Riemann-Weil formula for the density of the zeros. |
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Jan 28 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? typos corrected :) ..the idea is that the Riemann-Weil trace is just equal to the Gutzwiller trace of a dynamical system.. |
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Jan 28 |
revised |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? added 1 characters in body |
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Jan 28 |
accepted | Evaluation of integral involving $ \tanh(ax) $ |
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Jan 28 |
asked | Evaluation of integral involving $ \tanh(ax) $ |
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Jan 28 |
comment |
Why the Wu-sprung model is not accepted as a solution to Riemann HYpothesis ?? i meant the equations, which are the ones that are really important :D |
