But nonetheless I was reading about it recently, and I ran across this, listed among a collection of alleged proofs of the Riemann Hypothesis, with the sole descriptor being the word “What?”
The first line with a bracketed explanatory statement, I confess I cannot apprehend at all: there is introduced into the summand a factor of n2s-1 from, as near as I can tell, nowhere in particular. I am not actually sure that this is erroneous, however, as the subconclusion a few lines below —
— happens to be true; I may just be missing something.
The more blatant error is actually below that, at the second bracketed statement. The bracketed statement alone is cause for bogglement: that F(x) = F(y) ⇒ x = y "for some range". In general this is of course absurd: consider any constant function. I could actually see something like this being true for the zeta function, given its universality — it seems plausible that something like ‘for any given open set U ⊆ ℂ, (∀z∈U: ζ(z) = ζ(z+k)) ⇒ (k = 0)’ might be valid, and possibly even for some class of non-open sets that could qualify as a "range". However, this does nothing to rule out zeroes at points, which the zeroes probably are anyway.
Edited 2008-12-18: corrected typo in proposition (∈ for ⊆).
2 comments:
http://www.archive.org/details/BeyondRiemannAndTheRandomDistributionOfPrimes
... the "paper" referenced by the above link is not, by any stretch of the term, mathematics.
Amusingly, the description claims a proof of the Riemann hypothesis, which is mentioned once in the introduction and then promptly forgotten.
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