Riemann Hypothesis on Grönwall's Function

EasyChair Preprint 9117, version history

VersionDatePagesVersion notes
1
October 24, 2022
5
2
January 3, 2023
6

Make clear the arguments

3
April 22, 2023
6

Put explicitly the proof of the Riemann hypothesis.

4
April 30, 2023
6

We improved the Central Lemma

5
May 9, 2023
6

Set explicitly that the Riemann hypothesis is true in a theorem.

6
May 15, 2023
6

We changed the symbol ⪆ by > and simplified the abstract.

7
May 24, 2023
6

We changed the abstract and proof of Theorem 1

8
June 11, 2023
6

We improved the Proof of Theorem 1

9
June 15, 2023
7

We added the section Conclusions in order to finalize the manuscript and avoid future versions.

10
June 23, 2023
6

We provide more arguments to proof of Theorem 2.

11
June 28, 2023
6

Today, a researcher has suggested me this change that I applied, he told me:

What does mean
" We state that the Riemann hypothesis is true if and only if there exist infinitely many consecutive colossally abundant numbers N < N ′ such that G(N ) < G(N ′)."
Do you mean
"We state that the Riemann hypothesis is true if and only if there exist infinitely many pairs (N,N') of consecutive colossally abundant numbers N < N ′ such that G(N ) < G(N ′)."

12
June 30, 2023
7

I'm trying to make clearer and clearer again the arguments.

13
June 30, 2023
7

We improved Theorem 2

14
July 3, 2023
6

We removed the hyper abundant number definition (we changed the abstract, keywords and content).

15
July 8, 2023
7

We improved proofs of theorem 1 and 2.

16
July 23, 2023
7

We provided stronger arguments in the last theorem.

Keyphrases: Arithmetic Functions, Colossally abundant numbers, Extremely abundant numbers, Hyper abundant numbers, Riemann hypothesis

BibTeX entry
BibTeX does not have the right entry for preprints. This is a hack for producing the correct reference:
@booklet{EasyChair:9117,
  author    = {Frank Vega},
  title     = {Riemann Hypothesis on Grönwall's Function},
  howpublished = {EasyChair Preprint 9117},
  year      = {EasyChair, 2022}}