In 1849, the German mathematician Gauss large average distribution density of primesnear x. Based on the density of the Gauss proposed regional distribution of prime numbers theorem.And regional distribution of prime numbers theorem proved easy to understand way. Thefundamental theorem to obtain the distribution of prime numbers. Thus proving that a new primenumber theorem. Therefore gives the details of the calculation.

Periodical:

Bulletin of Mathematical Sciences and Applications (Volume 3)

Pages:

45-48

Citation:

D. Liu, "Distribution of Prime Numbers Fundamental Theorem", Bulletin of Mathematical Sciences and Applications, Vol. 3, pp. 45-48, 2013

Online since:

February 2013

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Distribution:

Open Access

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Creative Commons Attribution 4.0 International License

References:

Manin (Russia) and other. (2006). modern number theory guided . the Science Press.

Hua. (1979). number theory guide . Science Press.

(Germany), Neukirch. (2007). Algebraic Number Theory. Science Press.

Hua, Wang Yuan. (1963). numerical integration and its application. Science Press.

Pan Cheng-dong, the Pan Chengbiao. (1988). prime number theorem, elementary proof of the . Shanghai Science and Technology Press.

Lu Changhai. (2004). (USA). Riemann hypothesis.

Dan Liu. (2011). Distribution of prime numbers iterated function. Canadian mathematics research.

Dan Liu. (2012). Conversion of the Riemann prime number formula. Asian Journal of Mathematics (SAJM).

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