Proving the Twin Prime Conjecture

Dan LIU, Jingfu LIU

Abstract


Presented and proved symmetry primes theorem, parallelism proving the twin primes conjecture, Goldbach conjecture. Give part of the calculation.

Keywords


Integer; Primes; Composite number; Theorem

Full Text:

PDF

References


Manin (Russian) et al. (2006). Modern number theory guided. Science Press.

Hua, L. G. (1979). Number theory guide. Science Press.

Neukirch, J.(2007). Algebraic number theory. Science Press.

Wang, Y. (Ed.).(1987). Goldbach conjecture research. Heilongjiang Community Education.

Liu, D. (2005). Goldbach conjectureelementary discussion. Neijiang Science and Technology, (2).

Liu, D. (2013). Elementary discussion of the distribution of prime numbers. Progress in Applied Mathematics.

Liu, D., & Liu, Jingfu. (2013). Riemann hypothesis elementary discussion. Progress in Applied Mathematics.

Liu, D. (2013). The proof of the jie bove conjecture. Studies in Mathematical Sciences.




DOI: http://dx.doi.org/10.3968/4014

DOI (PDF): http://dx.doi.org/10.3968/g6167

Refbacks

  • There are currently no refbacks.


Copyright (c)




Share us to:   


Please send your manuscripts to sms@cscanada.net,or  sms@cscanada.org  for consideration. We look forward to receiving your work.

 

 Articles published in Studies in Mathematical Sciences are licensed under Creative Commons Attribution 4.0 (CC-BY).

 STUDIES IN MATHEMATICAL SCIENCES Editorial Office

Address: 1055 Rue Lucien-L'Allier, Unit #772, Montreal, QC H3G 3C4, Canada.

Telephone: 1-514-558 6138

Http://www.cscanada.net
Http://www.cscanada.org
E-mail:caooc@hotmail.com

Copyright © 2010 Canadian Research & Development Centre of Sciences and Cultures