
Re: equivalence of truth of Riemann hypothesis
Posted:
Jan 5, 2013 11:06 AM


On 01/05/2013 09:55 AM, Jean Dupont wrote: > In the book "Math goes to the movies" it is stated that the truth of the Riemann hypothesis is equivalent to the following statement: > $\exists C: \forall x \in \mathbb{N}_0: \left\pi(x)\operatorname{li}(x)\right \leq C \sqrt{x} \log(x)$ > > Is this correct? > > thanks > jean
The movie "A Beautiful Mind" about John Nash is now on Youtube:
< http://www.youtube.com/watch?v=OOWT1371DRg > .
I think John Nash in the movie or in reality tried to make headway on the Riemann Hypothesis ...
David Bernier
P.S. I'm afraid I can't read Tex or Latex ...
But, please see "error term" in Prime Number Theorem, here:
primepages, 1901 von Koch result:
< http://primes.utm.edu/notes/rh.html >
I trust PrimePages. Also, Schoenfeld(1976) explicit bound:
< http://en.wikipedia.org/wiki/Riemann_hypothesis > .

