@article{ajams2014223,
author={Mazurkin, P.M.},
title={Increment Primes},
journal={American Journal of Applied Mathematics and Statistics},
volume={2},
number={2},
pages={66--72},
year={2014},
url={http://pubs.sciepub.com/ajams/2/2/3},
issn={2333-4576},
abstract={The increment of prime numbers was a clear indication. Increase - the number increases, the addition of something. If the number of prime numbers, figuratively called the "ladder of Gauss-Riemann", the increase may well be likened to the steps, separated from the ladder itself. We prove that the law is obeyed z<SUB>2</SUB>(i<SUB>2</SUB>=2)=1/2-1/2cos(<span style="font-family:Times New Roman; font-size:16px;">&#960;</span>P(n)/2) in the critical line i<SUB>2</SUB>=2 of the second digit binary number system. This functional model was stable and in other quantities of prime numbers (3000 and 100?000). The critical line is the Riemann column i<SUB>2</SUB>=2 binary matrix of a prime rate. Not all non-trivial zeros lie on it. There is also a line of frames, the initial rate (yields patterns of symmetry) and left the envelope binary number 1. Cryptographers cannot worry: even on the critical line growth of prime numbers z<SUB>2</SUB><SUB>i</SUB>=1/2-1/2cos(<span style="font-family:Times New Roman; font-size:16px;">&#960;</span>P<SUB>j</SUB>/2) contain the irrational number <span style="font-family:Times New Roman; font-size:16px;">&#960;</span>=3.14159бн.},
doi={10.12691/ajams-2-2-3}
publisher={Science and Education Publishing}
}