However, this is Chen Zhou in an ideal state.

In other words, Chen Zhou needs to be fully immersed in the world of learning.

As long as he is completely immersed in the ocean of knowledge of the literature, Chen Zhou can absorb the knowledge as quickly as possible.

But it's a process.

Every time I finish reading a document, there is also a process of going out and going in.

So, to make sure that you can complete the planned content.

From time to time, Chen Zhou stayed up late to study with his liver.

Grab the time as far forward as you can.

Let φ(n) and S(n) be the Euler function and the Smarandache function of the positive integer n, respectively. It is well known that the exact formula for calculating S(n) is an open and unresolved problem. Using the methods and techniques of elementary school, the accurate calculation formula of S(p^α) is given, where p is a prime number and α is a positive integer, so as to completely solve the above public problem......】

[From this, the property of the positive integer solution (n,k) of equation φ(n)=S(n^k) is obtained, and several necessary conditions for σ((2^α)q)/S((2^α)q) to be a positive integer, where q is an odd prime number, and σ(n) denotes the sum of all the different positive factors of n. 】

Chen Zhou finished reading a paper on "Accurate Calculation Formulas of Smarandache Functions and Solving Equations in Correlation Number Theory" again.

The key words in this paper are "Smarandache function", "Euler function", "Gaussian function", and "complete number".

Chen Zhou is very familiar with the content corresponding to these keywords.

In particular, the "Smarandache function" and the "Euler function".

When Chen Zhou read the literature in the past few days, he didn't see these two things.

The Smarandache function S(n) is one of the important number theoretic functions.

Euler's function refers to the number of numbers coprime with n in a positive integer less than or equal to n in number theory.

Derived from Euler's function, the facts in ring theory, and Lagrange's theorem, constitute the proof of Euler's theorem.

As for the "Gaussian function", it is named after Gauss, the prince of mathematics.

It is also a function with a wide range of applications.

Whether it is the natural sciences, social sciences, or engineering and other fields, Gaussian functions can be seen.

In particular, it is worth mentioning that in the formula of the Gaussian function, when c = 2, the Gaussian function is a characteristic function of the Fourier transform.

This means that the Fourier transform of the Gaussian function is not just another Gaussian function, but also a scalar multiple of the function on which the Fourier transform is performed.

Chen Zhou looked at these keywords at the end of the document, and relevant knowledge kept flashing in his mind.

This is also Chen Zhou's habit when reading literature.

Although this is a key word in other people's literature, it does not prevent Chen Zhou from thinking about it.

Retracting his thoughts, after Chen Zhou closed this article, he looked up at Yang Yiyi on the other side of the video.

Yang Yiyi seems to have encountered a problem.

Chen Zhou saw that her eyebrows were furrowed, and the pen in her hand kept writing and stopping.

But Chen Zhou didn't say anything.

In the plan, the evening is the time for him and Yang Yiyi to discuss problems with each other.

It's better to let Yang Yiyi think more about it now.

Suddenly speaking out will definitely interrupt Yang Yiyi's train of thought, but it is not good.

After glancing at Yang Yiyi again, Chen Zhou withdrew his gaze.

This time, Chen Zhou was not in a hurry to open the next document.

Instead, I opened the browser, typed in the URL of the e-Print arXiv website, logged in to the website, and browsed.

A month has passed since Chen Zhou returned home, and it will be the end of July.

During this time, Chen Zhou was completely immersed in his own world and walked strictly according to the plan.

I didn't pay attention to the results of this month's research in the mathematical community.

This will be a good time to take a moment to see if there are any outstanding research results in the field of number theory.

According to his previously selected interest tags, Chen Zhou found recent papers in the field of number theory.

"Proving the Riemann conjecture?"

At first glance, Chen Zhou was shocked by the title of the paper.

But after reading it carefully, Chen Zhou felt that this paper was too watery.

What made him even more speechless was that the author of the paper used the method was actually his distribution deconstruction method!

But it's so badly used, even the most basic logic in the distribution deconstruction method has not been clarified, and it is being used indiscriminately!

Chen Zhou left a 100-word long comment on this paper with his backhand, and criticized the author.

In fact, it doesn't matter whether the Riemann conjecture is or not.

The main thing is the distribution deconstruction method, which really makes Chen Zhou angry.

At the same time, Chen Zhou also contacted the webmaster and asked to take down the paper.

Although the e-Print arXiv website is only a website for preprints, there are still many peers on it.

If this is seen by peers who don't know the truth, wouldn't it be a great misunderstanding of the distribution deconstruction method?

Chen Zhou would not allow this to happen.

At least, after he saw it, it was absolutely not allowed.

This is Chen Zhou's defense of his research results!

Use it right, whatever you want.

But if it is wrong, Chen Zhou must point it out.

After the webmaster agreed to remove it, Chen Zhou was satisfied.

Continue browsing through related papers.

The rest of the papers, although Chen Zhou has also seen a lot of claims to prove the Riemann conjecture and prove the Goldbach conjecture.

But he didn't click on it, these are all gimmicks.

It is estimated that most of them are people from the civil sciences and are posted on the e-Print arXiv website.

Speaking of which, the reason why Chen Zhou's mailbox was full so quickly.

These civil scientists also need to bear a large part of the responsibility.

Because from time to time, Chen Zhou would inexplicably receive an email from them.

Some questioned Chen Zhou's method of proof.

There are also those who question Chen Zhou's proof process.

also stuffed his own proof method over, asking Chen Zhou to admit that he was wrong.

There is even a need to compete with Chen Zhou for the right to prove mathematical conjectures.

They believed that their proof was also correct, and it was earlier than Chen Zhou.

So, they are the first provators of these mathematical conjectures, such as the hail conjecture, the Kramel conjecture, and the Jebov conjecture.

And Chen Zhou, a little kid who came out of nowhere, is completely preempting academic achievements!

In this regard, Chen Zhou was a little crying and laughing, but he had only one way, and that was to block it!

After reading a few more papers and skimming through the titles of related papers.

Chen Zhou closed the e-Print arXiv website and prepared to continue reading his literature.

At this time, a prompt message suddenly popped up on his mobile phone.

Chen Zhou glanced at it obliquely, and was stunned for a moment.

Then he chuckled softly: "It's really slow enough, it's been so long since I graduated that you two can handle it." I'm sorry to help you take a step ahead of schedule......"

As he spoke, Chen Zhou clicked on the message prompted on his mobile phone.

This is a news software prompt message.

The content of the news is about mathematical conjectures.

This mathematical conjecture is the twin prime conjecture that is on par with the Jebov conjecture.

Tao Zhexuan and Zhang Yitang, more than a month after Chen Zhou completed his thesis and graduated from his bachelor's degree, finally completed the proof of the twin prime conjecture.

In this regard, the media in the United States naturally became excited instantly.

Although it was later than Chen Zhou, although he lost the game.

But this is a twin prime conjecture that is not inferior to Jeffov's conjecture?

This is also a world-class mathematical conjecture problem, right?

Therefore, the media in the United States are very excited to report on this matter.

In contrast, the media in China are much calmer.

They just reported on it objectively and didn't comment too much.

However, there are also some self-media who report this matter with the title of "belated second".

It was emphasized that Tao Zhexuan and Zhang Yitang lost the match against Chen Zhou.