From university lecturer to chief academician Chapter 198: Face the past, Donggang University gives a report, Huang Yichun: Wang Hao will agree to come back.
Chapter 198: Face the past, Donggang University gives a report, Huang Yichun: Wang Hao will agree to come back.
Domestic network.
Wang Hao's blog suddenly updated several articles at once. After a closer look, I found that they were published separately from one paper.
Some netizens curiously clicked in and saw the title of the article.
"Proof of Smoothness of Solution Set of NS Equations"
--continuation of the conventional special value argument for infinite values.
For a while, the comments exploded.
Among the netizens who follow Wang Hao, there are many mathematics-related people, including some graduate students and doctoral students in the Department of Mathematics, who occasionally expect Wang Hao to publish some small proofs.
The difficulty of these small proofs does not need to be too advanced. If they can understand them all, it is a victory. They can also use this to test their own level.
Now, the only thing they can understand directly about this article is the title. Some people are a little confused when they see the title, because Wang Hao has published two papers related to NS equations in the top issues.
One of the articles is about finding approximate solutions to NS equations.
The other article is a proof of the smoothness of the solution set of NS equations under the normal value range, which can also be considered as a weakening proof of the NS equation problem.
Now there is another proof of the smoothness of the solution set of NS equations. They didn't react for a while, but when they thought about the title carefully, they were shocked.
"Continuing the regular special value argument to infinite values? Does this mean that the value range is expanded to infinite?"
"Doesn't this solve the NS equation problem?"
"Really or not? The NS equation problem has been solved? This level of research cannot be published on a blog, right?"
“That’s what the title says!”
"One of the seven major mathematical problems of the millennium, prove that the content is posted on the Internet? Is it possible?"
Suspicions were everywhere for a while.
They really couldn't understand how such a major proof could be posted directly on the Internet?
Later someone commented, "How is this impossible? How can our ordinary thinking understand top mathematicians? Perelman's Pang Jia Lai conjecture was also posted on the Internet."
"Yes, that makes sense!"
"So, this is the proof of the NS equation problem?"
"Wang Hao solved this problem?"
"The international mathematics community will be shocked!"
soon.
Many scholars also knew the news, and they immediately came to check out this paper.
The paper has a total of thirty pages and is divided into many parts. The overall content is complete, but most people feel numb after reading the first article.
Even some mathematics professors can no longer stand it after reading a few pages.
On the one hand, it is difficult, and on the other hand, it is too complicated. The reason for the complexity is that it involves a lot of logical arguments.
Someone flipped through it carefully and found that twenty pages were devoted to demonstrating the computational logic of parameter values. It seemed that after the demonstration was completed, the problem had been solved, and there were only twelve pages left.
This kind of content involving complex logical arguments is often the most difficult to understand.
Even if it involves complex calculations, you can roughly understand it based on the conclusion, but complex logic needs to be understood slowly.
At the same time, some professional mathematicians were also indispensable, and they slowly reviewed the paper from the beginning.
At the same time, the official news released by Xihai University was also reproduced by the media, and coupled with the blog article published by Wang Hao, the problem was immediately explained directly.
Wang Hao completed the demonstration of the equation and posted the content on his blog.
This news immediately became the focus of public opinion.
That's the ns equation, one of the millennium mathematical puzzles.
Most people are not interested in complex mathematics, but it is different when it comes to top-level research in mathematics.
Even if they don't understand it at all, and they don't even understand what the NS equation is, it doesn't stop them from discussing it.
Because the proof was made by Wang Hao and domestic scholars.
This can bring a sense of honor.
Domestic research on mathematical theory is still far behind foreign countries, and many top-level mathematical research are completed by foreign scholars.
Another solved millennium mathematical problem, the Poincaré conjecture, was also completed by mathematicians from other countries.
Now seeing that domestic scholars have completed top-level mathematical research, many people can't help but feel a sense of honor in their hearts.
…
At the same time, Wang Hao's paper posted on Arxiv also attracted the attention of foreign scholars.
Brian Wilson is a professor at the Clay Mathematics Institute. Before getting off work every day, he goes to Arxiv to browse the latest mathematical research.
Most of these studies are meaningless, but some studies can still bring inspiration and make people feel bright.
When the mouse rolled over a web page, he saw a paper title.
"Proof of smoothness of solution set of NS equations?"
Brian Wilson even laughed when he saw this title. He subconsciously thought that it was an unknown person who had done some marginal research and thought that the proof had been completed. Unfortunately, his submissions to top journals were rejected.
, will be published on Arxiv.
Just as he was about to move the mouse over, he noticed the name of the author of the paper.
"Wang-Hao?"
"This name seems familiar?"
He thought about it and his eyes widened, "Wang Hao? Are you kidding me?"
After clicking on the content introduction, I took a closer look and noticed the introduction in the author column - Xihai-University, Wang-Hao!
That's right, it's that Wang Hao!
Kakutani's conjecture, the prover of Goldbach's conjecture, the prover of the weakening smoothness of NS equation values!
Wilson was immediately shocked, "So, on the basis of weakening the proof, he expanded the scope and completed the argument for infinite values?"
"He solved the NS equation problem?"
He stared at the introduction of the paper and remained motionless for a long time. Finally, he turned around and quickly downloaded the paper, and kept saying, "This is impossible!"
"impossible!"
Then he read the content of the paper carefully and couldn't stop reading it.
…
Japan, University of Tokyo.
Toshiro Mikio is the Wolf Prize winner. The Japanese mathematics community calls him the second Ito Kiyoshi. He is indeed very similar to Ito Kiyoshi. He is also a professor at the University of Tokyo and has also won the Wolf Prize. Even in the field of research and development, he is very similar.
similar.
This chapter is not finished yet, please click on the next page to continue reading the exciting content! However, Tian Jun Mikio does not want to be the second Ito Kiyoshi, because he is still very young, only 37 years old, and he hopes to get a Fields.
In this way, he can surpass Ito Kiyoshi and become the top internationally recognized mathematician.
Fields is the highest honor in mathematics.
At this time, Tian Jun Mikio was thinking about the nonlinear partial differential equations meeting that had just passed and Nakamura Masao's judgment on the NS equation issue.
Masao Nakamura believes that Wang Hao's method of proving the smoothness of the weakened values of the NS equation cannot be used to solve the problem of the NS equation, that is, it cannot expand the conventional values to infinite values.
Tian Jun Mikio thought about it carefully and thought it made sense.
He carefully studied Wang Hao's proof and found that this idea had reached its peak. It was impossible to continue to expand the value range according to the method, and naturally it could not be extended to infinite values.
"And in most of the most difficult research, the idea of weakening the proof often fails to solve the problem itself."
"The sieving method of Goldbach's conjecture is like this, and the bounded gap of the twin prime conjecture is like this."
"There are always limits to the idea of weakening the proof. If you want to complete the proof, you still have to think of new ideas..."
Tian Jun Mikio was thinking.
Suddenly there was a knock on the office door, and a doctoral student walked in and said excitedly, "Teacher Tian Jun, there is a paper on Arxiv that you will definitely be interested in. Many scholars are discussing it."
"What is it?" Tian Jun Mikifu asked with doubts.
"The proof of the NS equation was completed by Wang Hao. You can look for it."
"What?"
Tian Jun Mikio thought he had heard wrongly, so he immediately logged in and searched, and saw the paper published by Wang Hao.
He read the title carefully and was even more surprised, "Continuing the regular special value argument with infinite value?"
"In other words, he expanded and completed the argument with infinite twists and turns based on the conventional value proof?"
"How can this be!"
…
Many scholars at home and abroad know that Wang Hao has published a paper proving the NS equation.
They are all studying.
Domestic public opinion is very hot, and related topics have reached the top three hot topics, with many people discussing this matter.
Probably because of their confidence in Wang Hao, some media even concluded that he had solved the NS equation problem when reporting on it.
But there are still some rational people explaining the situation, "It cannot be said now that the NS equation problem has been solved."
"Although Wang Hao has posted the paper, there is no confirmation from a top institution."
"The content of his paper is very complex. It must be a report, and it is an international report."
"The difficulty of this paper is too high. It involves a lot of logical calculation arguments. The review must be very difficult. I will definitely need to explain it myself."
"I can't be sure whether it is correct now, it still depends on the report."
"However, the good news is that no one has pointed out the error yet..."
Reporting is not required.
But for the world's top mathematical results, it is best to make a report, otherwise the review will take a long time, and problems may arise if it is delayed for too long.
Perelman also posted the proof of the Poincaré conjecture on the Internet, but he had a somewhat weird personality and refused to make relevant reports, which later triggered a series of disputes.
Xihai University is also concerned about Wang Hao’s report.
The school still has "self-awareness". In the field of mathematics, Xihai University's influence is too low, and the report must not be conducted in the university.
Even though Wang Hao himself has high enough influence, there are no other authoritative mathematicians in the university.
Wang Hao does not need to worry about the location for his report, because many institutions have sent invitation letters, including some top foreign institutions.
He first excluded all foreign institutions for the simple reason that he did not want to go abroad.
"I only plan to give a report in China." Wang Hao said to Zhou Qingyuan, "Just choose one from a university, or the Institute of Mathematics of the Academy of Sciences."
He looked at the invitation letter carefully and found that invitations were sent from top universities, including Shuimu University, Capital University, Donggang University, Sudong University, etc.
"How about Shuimu University? Or the Institute of Mathematics of the Academy of Sciences?" Wang Hao still asked Zhou Qingyuan. His mathematical achievements were much higher than Zhou Qingyuan's, but Zhou Qingyuan could still provide advice on some things.
Wang Hao prefers Shuimu University or the Institute of Mathematics of the Academy of Sciences.
The former, familiar.
The latter is a little curious. After all, it is the Academy of Sciences and its influence is still great.
Zhou Qingyuan gave a different opinion, "Why don't you go to Donggang University?"
"Donggang University?" Wang Hao shook his head subconsciously.
"right."
Zhou Qingyuan said seriously, "I suggest you go to Donggang University." He sighed and said, "Wang Hao, I am aware of the problems you have with Donggang University, but you should face the past and at least not be affected by the past."
"In terms of domestic mathematics, Donggang University is the most authoritative in the field of partial differential equations. There are two academicians in related fields sitting there."
"For such a major research, Donggang University is definitely the first choice for reporting in China."
Zhou Qingyuan's words were very sincere, and Wang Hao couldn't help but think.
When choosing the location to give the report, he almost subconsciously excluded Donggang University. Whenever he thought of Donggang University, many memories would flow through his mind.
Tutors, classmates, acquaintances, friends, and that touching figure...
etc.
very many.
These memories are not his own, but even if he is subjectively aware of the difference between himself and his predecessor, the memories are always reflected in his mind.
It was precisely because of the existence of these memories that he subconsciously denied Donggang University.
The dismissal was also an important reason at that time, but everything has long since passed. Donggang University issued an announcement that everything had nothing to do with him. The matter has been clarified, and Chen Jianlin of the Alloy Laboratory is also under investigation.
So, what will happen if you choose Donggang University to give a report?
The dismissal incident may be mentioned again?
Might the alloy laboratory issue be refocused?
Or, everything is calm? Just give a report normally?
Wang Hao thought and walked out.
He walked to the playground, sat on a hard stone bench, and kept watching the lively scene on the playground.
At the same time, sort through those memories.
Zhou Qingyuan is right in saying that he should not be affected by the past.
Donggang University is Donggang University.
He is who he is.
Even now, when many people talk about him, they will still say that Donggang University is a stigma of the past, and he hopes to completely get rid of the stigma and completely separate from Donggang University.
If Donggang University doesn't even face it, how can it be divided?
If you want to get rid of something, you must first face something.
He pursed his lips hard.
A decision has been made.
…
A formal reply email was received in the email address of the Propaganda Department of Donggang University.
After the staff member opened the email, he was immediately shocked because the email was from Wang Hao of Xihai University. He immediately reported the news.
Hu Fang, director of the Propaganda Department, was stunned when he saw the news.
When Donggang University invited Wang Hao to give a report, it could be said that it was just a routine email. I never thought that Wang Hao would agree.
The entire school knows about the complicated entanglement between Wang Hao and Donggang University.
Although the matter has passed, most people believe that the chance of Wang Hao choosing Donggang University to give a report is still very low.
He has a very good relationship with Qiu Chengwen of Shuimu University, and there is a high probability that he will still give the report at Shuimu University.
Now seeing Wang Hao's formal reply, Hu Fang was surprised and quickly told her superiors about the matter, and also immediately notified the School of Mathematics.
This requires careful preparation.
Because it involves major international achievement reports, the scale will be no worse than an international conference. Compared with some ordinary conferences, the scale will be larger, and many top mathematicians will definitely come.
These must be considered.
Professors in the School of Mathematics don’t have to think so much.
They were very excited when they heard the news, "Did you understand? Wang Hao agreed to come to our university and reported it!"
"He's coming back?"
"It's a good idea to come back. He just came to make a report!"
"It's okay to give a report. This is equivalent to returning to your alma mater!"
"I haven't seen Wang Hao for several years. Having said that, I'm really looking forward to it. He will still give a report on NS equations. This may become a mathematical event unique to him!"
This matter is very important to Donggang University.
One is because it is the world's top mathematics research report, and many top mathematicians will definitely come, which will also boost Donggang University's authority in the field of partial differential equations.
Secondly, Wang Hao is different. He is a scholar with the brand of Donggang University.
Now it is equivalent to returning to Donggang University, and many people are looking forward to it.
Including Donggang University, including the School of Mathematics, they have begun to prepare for this. They have to hold meetings to set a time, and also publish news internationally and invite top scholars in the mathematics world.
Many people knew the news, including Huang Yichun, deputy director of the Academic Affairs Office.
Huang Yichun was surprised when he heard the news, and then started to look forward to it.
In the past two years, he had been having a very bad time in school. He was almost being beaten up by everyone, especially several professors from the School of Mathematics, who didn't look at him well when they met him.
At first, he felt that similar things would pass after he endured them.
Later, Wang Hao completed various researches and became more and more famous. At the same time, his reputation became bad in the school.
Many people describe him as ‘the sinner of Donggang’.
However, Huang Yichun still insisted on going to work every day and tried not to cause problems because it was impossible for him to find a similar job.
If he leaves his post, he will have no choice but to retire early.
The important thing is that there is not even a pension.
Now he is still a few years away from retirement, and he thinks it will be over if he can get through it, but it really feels like every day is like a year.
Even on some issues within his scope of authority, he did not even have the right to speak. When he participated in some school meetings, he could only be a spectator.
When he heard that Wang Hao was coming to Donggang University to give a report, Huang Yichun thought about the opportunity to make a comeback.
He knows what he can do to restore his image.
It's very simple, dig Wang Hao back.
As long as Wang Hao can be persuaded to return to Donggang University, everything will become a thing of the past. Maybe he can become a hero of the school?
No matter what, he can raise his head again, wash away the stains on his body, and maybe even return to the position of director directly.
The position of director is still vacant, and it seems that he is waiting for his re-assume.
"What will we do then?"
Huang Yichun thought carefully, "Wang Hao is from Donggang. He must want to come back, but he lacks the steps."
"When the time comes, bow your head and admit your mistake. If it doesn't work, kneel down and admit your mistake. Please beg him back and give him enough steps to step down."
He didn't consider the issue of face at all, because now he no longer had any face.
If kneeling down can bring Wang Hao back, what will other people say? They will say, 'Huang Yichun knelt down to beg Wang Hao for the development of Donggang University.'
That’s not shameful, but it sounds great!
"When the time comes, if the responsibility is placed on Chen Jianlin, Wang Hao probably doesn't know that Chen Jianlin has already been investigated, right?"
Due to the lack of relevant sources, Huang Yichun is not sure.
However, the addition of the news that Chen Jianlin was under investigation and that the entire alloy laboratory was under investigation was enough to relieve Wang Hao's anger, right?
After he has relieved himself and found his way down, will he still refuse to come back?