Scholar’s Advanced Technological System

The sky was bright outside the window.

Lying on the desk, Lu Zhou slowly opened his eyes.

Rubbing his sour brows, he looked at the calendar at the corner of the table.

It's May ...

Lu Zhou shook his head with a headache.

Since he came to Princeton in February until now, he has spent almost half of his time in this ten-square-meter house. He has basically never visited the house except for driving to the supermarket to buy food.

What distressed him most was the $ 5,000 club card, which he didn't even use a few times.

He has been challenging Goldbach's conjecture for nearly half a year since receiving that mission.

Now, all this has finally come to fruition.

Taking a deep breath, Lu Zhou stood up from his chair.

At the last step, he was not so anxious.

Humming Xiaoqu went into the kitchen and made himself something to eat. Lu Zhou even took out a champagne from the refrigerator, opened the bottle cap and poured it on himself.

Champagne was bought two months ago for this moment.

After enjoying the dinner quietly, Lu Zhou calmly went to the kitchen to wash his hands, then returned to the desk and began to finish off his work for a period of time.

After passing nearly fifty pages of thesis paper, he fell asleep before finishing writing and continued to write.

... obviously, we have px1, 1px, x11612pxx, p, xq2xlog4 ... 30

… From Equation 30, Lemma 8, Lemma 9, Lemma 10, it can be proved that Theorem 1 holds.

The so-called Theorem 1 is the mathematical expression of the Goldbach conjecture that he defined in his thesis.

That is, given a sufficiently large even number n, there are prime numbers p1 and p2, which satisfy np1p2.

It is similar to Chen's theorem np1p2p3, and a series of theorems on pa, b.

Of course, although this formula is now called Theorem 1 in his dissertation, it may not be long before the mathematical community generally accepts his proof process, and this theorem will probably be upgraded to the "Luo's theorem" Things like that.

However, such major mathematical conjectures generally take longer to review.

Perelman's paper proving Poincaré's conjecture took three years to be recognized by the mathematical community. Mochizuki's new proof of abc's conjecture was mixed with a large number of "mysterious terms". At least the review threshold must be read first. The "Cosmic Theory" is only an introduction, so no one has read it until now, and it is expected that it will be difficult in the future.

The speed of reviewing a major conjecture depends to a large extent on the popularity of this proposition and how "new" the work is.

In proving the twin prime number theorem, Lu Zhou did not apply a particularly novel theory, but only innovated the topology method mentioned in the paper published by Professor Zellberg in 1995. He has studied this paper. A person can quickly learn what he does.

For the papers proving Polynyak Lu's theorem, the review cycle obviously lengthened.

Even though his group construction method has been reflected in the proof of the twin prime number theorem, the composition of magic reform has caused it to deviate far from the scope of the sieve method. It took a lot of time to reach a final conclusion.

And this paper on Goldbach's conjecture proof, Lu Zhou wrote a total of fifty pages, and it took at least half of the space to discuss the theoretical framework he built for the entire proof.

This part of the work can even be published as a separate paper.

To a large extent, his review cycle depends on others' interest in the theoretical framework he has proposed and his acceptance of the theoretical framework he has proposed.

As for how long it will take, it is beyond his control.

In fact, Lu Zhou was thinking about what the system's criteria for task completion are.

If he completes the proof of a theorem, but no one recognizes his work for ten or even decades, does it mean that his task has to be stuck for so long?

What makes him most incomprehensible is that since the system's database stores huge data, it must come from a higher civilization. At least this civilization is more developed than the civilization on earth.

Without discussing the motive of its existence, Lu Zhou feels that the system from higher civilizations should not refer to the opinions of "indigenous people" to determine whether a problem is solved.

According to this analysis, Lu Zhou concluded that the completion of the system task should be determined by two factors.

One is correctness.

The other is public!

In fact, there is a very simple way to verify whether his proof is correct.

If it's just for publicity, it doesn't have to be posted to the journal ...

...

After completing the paper proving Goldbach's conjecture, Lu Zhou spent a full three days, putting the paper on the computer, converting it into a pdf file, and then logging into the arxiv official website to upload the paper.

He is more than 90% sure of the correctness, because his habit is to carry out a rigorous check on each conclusion and to repeatedly consider all possible mistakes.

As for publicity.

Arxiv without peer review is undoubtedly the fastest option!

The only drawback may be that it conflicts with the submission principles of some journals and conferences. For example, uploading a paper before the deadline may violate the double-blind rule, etc., but Lu Zhou is not concerned about these things now, and he believes that the journals that accept the manuscript , Will not care about those details.

After all, the contributor is no longer an obscure person, but the winner of the Cole Number Theory Award. The academic achievements reported are not an obscure work either, but a Goldbach conjecture in the eighth question of Hilbert 23, one of the crowns of the analytic number theory world, second only to the millennium problem!

In two days, he will reorganize the thesis, solve the formatting problems, make it look more comfortable ~ www.readwn.com ~, and then submit the annual mathematics.

The paper on Wilma's proof of Fermat's Theorem was originally reviewed by six reviewers at the same time. Lu Zhou did not know that his paper would be reviewed by several big brothers, but it should be no less than four. Right?

Looking at the upload completion pop-up window on the webpage, Lu Zhou breathed a sigh of relief.

In this way, even if it is completed?

After the paper is published, people or research units who are interested in this field will receive an alert similar to the alert. Not surprisingly, someone in the corner of the earth should already be reading his article.

I just don't know whether the system has a judgment value for the reading amount of the paper. If it exists, it will take a few days to verify his guess.

Sitting in front of the computer and waiting for a cup of coffee, Lu Zhou closed his eyes, took a deep breath, and meditated softly.

"system."

When he opened his eyes again, his eyes were pure white.

It has been a long time since I returned here last time, so that this time when I came in this place, Lu Zhou even felt a little uncomfortable.

Going to the translucent holographic screen, he reached out and pressed his hand on the task bar with a hint of confusion.

Soon he could verify his guess ...

At the same time, you can also know whether your thinking is correct.

and many more……

Just then, Lu Zhou suddenly realized a problem.

If the system does not respond to itself, does it indicate that the condition analysis of the task completion judgment is wrong, or that there is a problem with the thesis itself?

However, the system did not give him time to think about it.

Sounds like sounds of nature.

Immediately after, a line of text came into his eyes.

Congratulations host, complete the task!