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Understanding the Zeta function, without getting lost in the tricky paths of advanced complex analysis

Name: Understanding the Zeta function, without getting lost in the tricky paths of advanced complex analysis
Price: 17.99 EUR
Availability: InStock
Author: Prof. Dr. med. John Bredakis
ISBN: 978-3-656-35430-7

Scientific Essay, 2013

34 Pages

Prof. Dr. med. John Bredakis (Author)

Excerpt

General remarks on the Zeta function (s)

And the first 42 roots in the critical strip

Understanding the Riemann Zeta function

And the Riemann Hypothesis

X(s)=X(1-s) Analytic Continuation

Notice that: (1/2 + i.t) = (1/2 - i.t)

For further details see also the pdf by Theodore Yoder

An Introduction to Riemann Hypothesis

The proof that:

(pdf by T.Yoder)

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Real s>1

s=(1/2+i.t)

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Devoted to Uncle Fotis , my Mentor in Mathematics

The easiest proof of the following:

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(1/2 + i.t) = (1/2  i.t )

Roots in the above range: 30.424876126 32.935061588

37.58617815 40.918719012 43.327073281

48.005150881 49.773832478

Remarks about analytic continuation

See also the pdf by Lorenzo Menici

for the complete proof of the above

Some additional remarks on the Zeta function

Exclusively for the members of the top club

of Prime Numbers Theorem

Summary of the Riemann Hypothesis

(1/2 + i.t) = (1/2 i.t)

Excerpt out of 34 pages

Details

Title: Understanding the Zeta function, without getting lost in the tricky paths of advanced complex analysis
Author: Prof. Dr. med. John Bredakis (Author)
Year: 2013
Pages: 34
Catalog Number: V207998
ISBN (eBook): 9783656353768
ISBN (Book): 9783656354307
File size: 9532 KB
Language: English
Keywords: understanding, zeta

Quote paper: Prof. Dr. med. John Bredakis (Author), 2013, Understanding the Zeta function, without getting lost in the tricky paths of advanced complex analysis, Munich, GRIN Verlag, https://www.grin.com/document/207998

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