The Riemann Zeta function and the Fourier Transform

Maggio 17th, 2023 | by Marcello Colozzo |

The Riemann Zeta function and the Fourier Transform
Fig. 1


From Wikipedia:

Riemann did not discuss his hypothesis in any other publication and there is no evidence of private communications in which he claimed to have a proof of this conjecture. Instead, he presented as certain some other results relating to the quantity and arrangement of zeros in the critical strip which have all been proved, with the exception of only one, by other mathematicians in the following years. In particular, Riemann, in addition to giving an estimate of the number of zeros with real part in the interval [0,1] and imaginary part in [-T,T], stated that the fraction of such zeros lying on the critical line tends to 1 when T tends to infinity. Riemann believed he had a rigorous proof of this last statement, which, as he explains in a private communication to a colleague, he did not publish because it was not yet sufficiently simplified. Even today, even this weak form of the hypothesis awaits proof or disprovement.

Topics of this ebook:
- Introduction (Dirichlet series)
- A remarkable integral representation
- Riemann Hypothesis and Fourier Transform
- Zeros of the Fourier Transform

Download the ebook in PDF format

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