Marek Wolf
Published 2012-12-16, updated 2014-01-07Version 3
We give heuristic arguments and computer results to support the hypothesis that, after appropriate rescaling, the statistics of spacings between adjacent prime numbers follows the Poisson distribution. The scaling transformation removes the oscillations in the NNSD of primes. These oscillations have the very profound period of length six. We also calculate the spectral rigidity $\Delta_3$ for prime numbers by two methods. After suitable averaging one of these methods gives the Poisson dependence $\Delta_3(L)=L/15$.
Comments: Many changes incorporated: Gallagher theorem mentioned, in Sect. IV the averaging over "probabilistic'' primes and Fig.8 are added (p. 8). The spectral rigidity averaged over 100 realizations of these artificial primes displays perfect $L/15$ dependence. 11 Figures
Journal: Phys. Rev. E 89, 022922 (2014)
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