The Riemann Hypothesis is currently the most famous unsolved problem in mathematics. Like the Goldbach Conjecture (all positive even integers greater than two can be expressed as the sum of two primes), it seems true, but is very hard to prove. I did some playing around with the Riemann Hypothesis, and I'm convinced it is true. My observations follow. The Zeta Function Euler showed that z(2) = ...

Riemann Hypothesis ...

Dedicated to increasing and disseminating mathematical knowledge The Riemann Hypothesis Some numbers have the special property that they cannot be expressed as the product of two smaller numbers, e.g., 2, 3, 5, 7, etc. Such numbers are called prime numbers, and they play an important role, both in pure mathematics and its applications. The distribution of such prime numbers among all natural ...

The Riemann Hypothesis Riemann's Hypothesis was one of the 23 problems - milestones that David Hilbert suggested in 1900, at the 2nd International Conference on Mathematics in Paris, that they should define research in mathematics for the new century (and indeed, it is not an exaggeration to say that modern mathematics largely come from the attempts to solve these 23 problems). It is the most ...

Andrew Odlyzko: Papers on Zeros of the Riemann Zeta Function and Related Topics (see also Tables of zeros of the zeta function and Some unpublished materials on the main home page) The 10^22-nd zero of the Riemann zeta function, A. M. Odlyzko. Dynamical, Spectral, and Arithmetic Zeta Functions, M. van Frankenhuysen and M. L. Lapidus, eds., Amer. Math. Soc., Contemporary Math. series, no. 290, ...

The Riemann Hypothesis With Andrew Wiles' recent proof of Fermat's Last Theorem now confirmed, the most notorious unsolved problem in mathematics becomes the Riemann hypothesis. This conjecture states that all the zeros of in the strip lie on the central line Re(z)=1/2. Here is a completely elementary restatement of the Riemann hypothesis . Define a positive squarefree integer to be red if it is ...