https://figshare.com/articles/preprint/A_Proof_Of_The_Riemann_Hypothesis/20452449
So I came across this post on reddit and nobody seemed to have the knowledge to deem whether it was nonsense or not.
(Preamble: This question is an offshoot of this earlier post.)
In what follows, denote the classical sum of divisors of the positive integer $x$ by $\sigma(x)=\sigma_1(x)$, the deficiency of $x$ by $D(x)=2x-\sigma(x)$, and the aliquot sum of $x$ by $s(x)=\sigma(x)-x$.
Let $m = q^k n^2$ be an odd ...
@Feeds Seems that this author is extremely interested in odd perfect numbers and seems to have a hope that one example can be found despite the indications that there is probably none.
@Feeds Seems that such "proofs" occur over and over again.
I've recently read about Voronin's universality theorem (see e.g. https://en.wikipedia.org/wiki/Zeta_function_universality). It is said that this result extends to other kinds of zeta functions.
Now I'm wondering if this universality property is in any way related to the Riemann hypothesis. What ...
CD Close/Del This question is a table lookup that is easily answered by googling it. It's unfortunate we don't have a LMGTFY to use as an abstract dupe target (or do we?)