A possible new path to proving the Riemann Hypothesis
| Autor: | Zhu, Jing Min |
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| Rok vydání: | 2018 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | In the past 100 years, the research of Riemann Hypothesis meets many difficulties. Such situation may be caused by that people used to study Zeta function only regarding it as a complex function. Generally, complex functions are far more complex than real functions, and are hard to graph. So, people cannot grasp the nature of them easily. Therefore, it may be a promising way to try to correspond Zeta function to real function so that we can return to the real domain to study RH. In fact, by the view of Laplace transform, the whole picture of Zeta function is very clear and simple, and the problem can be greatly simplified. And by Laplace transform, most integral and convolution operations can be converted into algebraic operations, which greatly simplifies calculating and analysis. This is a really and full new way to research Zeta function, prime numbers distribution, RH and so on. In fact, many new, important and interesting results can be reached by this new way, far more that shown in this paper. In September 2018, I had discussed with Sir Michael F Atiyah about RH and our proofs, etc. Sir Atiyah was so nice and patient, and he gave my approach rather positive evaluation. These email records are opened in page 14, as a memory of him. Comment: 15 pages, 6 figures |
| Databáze: | arXiv |
| Externí odkaz: |
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