Some people in the complex office are still very strict with their mouths.
Luo Dayong reminded them not to go out and talk nonsense. He mainly reminded Zhu Ping. Zhu Ping held it in for half a month and did not say it to anyone else.
She felt like she was going to be sick.
No one mentioned this matter, and Zhang Zhiqiang naturally didn’t know about it either.
He only felt that he had been subjected to cold violence in the office. For several days in a row, he felt that the atmosphere was strange. Whenever he asked about it, he always heard the sentence, "Don't you know?"
Zhang Zhiqiang felt very wronged.
He thought about countless possibilities, but they were all rejected.
Yan Jing didn't say anything.
Honest Sun Jian didn’t say anything either.
Luo Dayong usually doesn't speak. Sometimes, he just looks at him and turns his head.
Zhu Ping...
Zhang Zhiqiang was sprayed once and had no intention of facing him again.
In the end, he still didn't know.
A few days later, the atmosphere in the office finally returned to normal, because no one mentioned the matter at all, and Zhang Zhiqiang also put the problem behind him.
One advantage of his character is that he does not hold grudges.
Whether he offended others or others offended him, ordinary small things are quickly forgotten after they pass.
The Mason Number Laboratory was quiet.
In the laboratory, only Helen knew that Wang Hao had completed the research, but she was not a gossip. It could even be said that she had no relevant thinking logic at all.
After she learned the news, she just quietly waited for the paper to be released.
For Helen, watching Wang Hao's proof is a learning process, and she is still looking forward to it.
But she also has some worries, or worries.
Helen naturally knew what Goldbach's conjecture represented. Anyone who could complete the proof of this conjecture could be said to have achieved success in mathematics.
When a man becomes famous, what will he do?
Especially single men...
When Helen thought about her age again, she couldn't help but feel a huge sense of urgency, which also made her spirit a little anxious.
The incident seemed to be over.
No one in the school was mentioning it, so it was naturally impossible for Wang Hao to take the initiative to say it. He didn't care whether others knew or not.
In addition, he thought Zhang Zhiqiang must have known it because he had said it once and asked Zhang Zhiqiang whether it made sense to use the second method to prove it.
The atmosphere in the school was calm.
Wang Hao felt very good. He didn't want to receive too much attention in advance.
He Yi told the news that the expert team from the Science Foundation has decided to come back after the middle of next month.
This is reassuring.
Wang Hao still cares about the physics laboratory project, and hopes that the expert team can come at a staggered time so that he can concentrate on the follow-up research.
It was much easier during this time.
Wang Hao usually just goes to class, he no longer immerses himself in research, and maintains a happy-go-lucky attitude towards life.
Of course, he still has something to do, which is the space agency's project.
The project of the Mason Number Laboratory is a part of the algorithm that completes the aerodynamic characteristics simulation system.
To put it simply, it mainly focuses on algorithms for analyzing partial differential equations and systems of partial differential equations. Other accompanying input, output, and auxiliary algorithms are relatively less difficult and cannot reach the level of research. Doctoral students and others can be responsible for them. .
Wang Hao handed over all peripheral work to Zhang Zhiqiang. In terms of core algorithms, he still worked with two professors, Zheng Yaojun and Qi Xiao.
Zheng Yaojun has also made certain achievements in the field of partial differential equations, and can be of great help in the underlying mathematical foundation of core algorithms.
Qi Xiao is very researched in algorithms.
If he can be given basic mathematical support, Qi Xiao will be able to complete the corresponding core code. His algorithm and code writing skills are much better than Wang Hao's.
Of course, the underlying mathematical foundation is the most important.
The Systems Engineering Division provided some original information, including the codes, calculation methods and mathematical analysis methods of their existing systems.
Wang Hao studied it patiently and found that the underlying aspects of mathematics were still a bit rough.
The original system required many people to do calculations and analysis and enter parameters, calculate the corresponding data based on the parameters, and then combine all other data and calculations to perform aerodynamic simulation.
This is a very troublesome process, and the deviation of the simulation effect is relatively large.
Of course, no matter how the algorithm capabilities are improved, the solution of the partial differential equations will definitely require some manual assistance to enter parameters. The difference is only the amount of input, but Wang Hao found that their manual calculation method is still relatively rough.
Probably because the research related to NS equations at that time was mostly solved by "substituting numerical values", and the difference between the approximate solution and the accuracy was naturally larger.
This is like calculating the value of a force. The precise point is 100 Newtons, but the values obtained are all 110, 90, and 89. The deviation is relatively large.
This deviation is sufficient for original use, but because the heavy-lift rocket under development has higher accuracy requirements, the deviation is outside the controllable range.
Wang Hao understood all the contents and immediately grasped one of the key issues--
Model lake calculation.
In the algorithm's solution to partial differential equations, there is a process of modular lake calculation.
This method of modular lake calculation can calculate 'approximate values' to enter subsequent calculations.
Because the conversion of equations cannot be completed by code, some necessary algorithms cannot directly calculate the results in the middle, so they will be processed using model lake processing.
Wang Hao had not done any research in this regard, so he asked Professor Qi Xiao.
Qi Xiao has a certain understanding of the modular lake algorithm, but he only knows a rough idea and knows some simple applications.
After Wang Hao got a general idea, he decided to conduct research on his own. He established a research task related to the 'Model Lake Algorithm' and began to carefully read the information on Model Lake Mathematics.
The difficulty of this research project is only 'E level', which does not reach the level of scientific research, but it is enough to improve the algorithm.
Wang Hao only hopes to use model lake calculations to reduce the deviation of internal calculation values to a certain range.
For example, the value originally ranged from 10 to 20.
If the value is 11, the deviation will be relatively large. If you narrow the range to 3~17, even if you pick a number randomly, the probability of deviation will be much smaller.
Of course, this is a matter of probability.
Many partial differential equations cannot be solved, and it is impossible to know what the exact solution is. Maybe '11' is closer to the exact solution, but only relative to a piece of data.
When the amount of data is large enough, narrowing down the range becomes too precise.
…
Wang Hao took his time to study the core algorithm of the aerodynamic simulation project, and the time soon came to the end of the month.
Liebnitz rushed to complete the review two days ago.
He has been busy reviewing this manuscript for more than half a month, and even made a special trip to the Royal Academy of Sciences.
His purpose in going to the Royal Academy of Sciences was to find top mathematicians to help divide the manuscript into several parts, and then he could find other mathematicians to review the manuscript in a targeted manner.
Finally, it was completed before the end of the month.
Although the process was very busy, the results were very gratifying, and the conclusions reached by all reviewers were passed.
"This is a correct proof!"
"Goldbach's conjecture has become a thing of the past, and it will become Goldbach's theorem from now on!"
"What a valuable moment!"
Liebnitz felt very excited, but he did not have time to feel the emotions. He immediately went to the printing factory, found the relevant person in charge, and decided to add more than 20 pages to the latest journal that had already been printed and published. New paper.
The person in charge of the factory was very embarrassed, "However, many of them have been printed, and the number exceeds 3,000 copies."
Liebnitz said nonchalantly, "Destroy all those. That is an incomplete journal. Adding this paper is the perfect one."
Although he is only the editor-in-chief of the Journal of Mathematics, he has already received the nod from the superior committee and naturally has the right to make this decision.
Three thousand copies, a huge loss.
But what's that compared to publishing a proof of Goldbach's conjecture?
Liebnitz still felt a lot of pressure. The reason why he insisted on publishing this issue was because Wang Hao mentioned that there was another proof and submitted it to "New Advances in Mathematics".
He hoped it was fake, a joke, but what if it was true?
This is something you can't afford to gamble on.
If "New Advances in Mathematics" publishes the proof of Goldbach's conjecture three months in advance, and three months later, Goldbach's conjecture will officially become Goldbach's theorem. If a new proof is published at that time, what else can be done? What’s the meaning?
In addition, credibility is very important.
Since Wang Hao has been promised to publish in the new issue, failure to do so will have a great impact on him personally and the journal.
If other people knew about this, the influence of "Acta Mathematica" in the mathematical community would definitely be damaged.
There is no doubt about this.
The next day was the beginning of the month. Laibunitz went home to rest, get a good sleep, and cheer up the next day to start a new day of work.
At three o'clock in the afternoon, he kept refreshing the web page.
That is the official website of "New Advances in Mathematics". The content catalog will be updated simultaneously on the official website for the new issue.
After finally refreshing again, there was new content on the webpage. After clicking in, he saw a piece of content, which immediately made Leibnitz's eyes freeze--
"Proof of Goldbach's Conjecture by Covering Method".
He immediately found Wang Hao's submitted paper, titled "Contrastive Analysis Method to Prove Goldbach's Conjecture."
"It really does!"
Laibnitz looked at the comparison for a long time, and finally smiled bitterly. He had previously thought that Wang Hao was unlikely to be joking, but he just couldn't believe what he said.
Now everything is set.
Wang Hao used two methods to prove Goldbach's conjecture and submitted articles to "New Advances in Mathematics" and "Acta Mathematics" respectively.
"What a genius, an absolute genius! Madman! Pure madman!"
"Number theory madman!"
"This is actually true. When I told it to the Academy of Sciences, no one believed it!"
"Let them see it! See it!"
Leibniz took a deep breath and thought, "It can't be like this. Mathematicians all over the world will talk about this soon, and no one will pay attention to the release of a new issue of Acta Mathematica."
"We must announce the news in advance..."
"right!"
"Announcement in advance!"
"Divert everyone's attention..."
…
It's not just about coming to Bnitz to pay attention to the updates of "New Advances in Mathematics".
It was already eleven o'clock in the evening on the other side of the world, and there were several people doing the same thing as Liebnitz.
This includes Wang Hao, Helen, and everyone in the complex office except Zhang Zhiqiang, who are constantly refreshing the website.
The moment has come.
Wang Hao refreshed to the new content, breathed a sigh of relief, and couldn't help but smile on his face.
The phone rang immediately, and the caller was Helen, "Congratulations, Teacher Wang, your latest research has been released."
"Thanks!"
Wang Hao's tone was also a little excited, proving that Goldbach's conjecture was a huge achievement. Even in his previous life, he had heard of this conjecture and even thought about it, but without any gains.
It is indeed very exciting to be able to complete the proof of the conjecture and successfully publish it in a top journal.
Helen was silent for a moment, then suddenly said, "You have already become famous after completing this research, right?"
"Ah?" Wang Hao didn't react for a while.
"I want to ask, would you consider getting married now?" Helen asked anyway.
"??"
Wang Hao was stunned. "How is this possible? What are you talking about?"
"Huh~~"
Helen was obviously relieved and continued, "I've been worried about this for a long time, okay, good night."
"..."
Wang Hao put down the phone, feeling very strange and not feeling the joy of being blessed at all.
The phone rang again.
This time it was Zhu Ping.
"Congratulations, Wang Hao, you have completed such an important proof! Hahahahaha, I am so happy."
"I've been holding it in for half a month, and I can finally tell others!"
"..."
The phone rang again, this time it was Luo Dayong.
"congratulations!"
Luo Dayong just said a simple sentence.
Wang Hao replied with a depressed tone, "That's strange. Zhu Ping called just now. Aren't you two together?"
"??"
One call after another.
After Wang Hao picked up another one, he immediately decided to turn off the phone and go to sleep. He would wait until tomorrow to talk about everything.
…
This night was destined to be restless.
It's better at home, because the country is experiencing a dark night.
Many scholars abroad have paid attention to the contents of the latest issue of "New Advances in Mathematics".
"There is actually a proof of Goldbach's conjecture in this issue?"
"It's Wang Hao! That Chinese math genius, he proved the hail conjecture. It's only been a year now, right? Has he completed such a major proof again?"
""New Advances in Mathematics" should be correct!"
"I got the latest issue, which has comments from Andrew Wiles and comments from Terence Tao!"
"Wiles said, we are very happy to welcome this moment. Goldbach's conjecture will not be just a conjecture. This mathematical problem that has been unsolved for 280 years finally has an answer!"
"Tao Zhexuan's comment said that this was the proof completed in the most impossible way. He had also thought of a similar method, but as soon as he thought about the complex analysis involved, he subconsciously thought it was impossible to complete."
"The key to this proof lies in the complex mathematical analysis."
"That's like a miracle!"
"..."
Lots of discussion, lots of admiration.
Many scholars are very much looking forward to seeing the content of the proof and studying the specific proof method.
Some mathematical institutions are sharpening their skills and even organized special groups to prepare detailed demonstrations of the proof process of the paper.
Although it is a paper published by "New Advances in Mathematics", no matter how authoritative an academic journal is, it cannot guarantee that the published paper is 100% correct.
Whether the paper is correct or not depends on the judgment of an authoritative mathematical institution.
However, the affirmation from two Fields recipients is enough to illustrate the credibility of the paper.
at the same time.
The journal website of Acta Mathematica published a message that puzzled all scholars who saw the news. “The new issue of Acta Mathematica will publish another proof of Goldbach’s conjecture by Wang Hao.”
"??"
This news is surprising.
"Journal of Mathematics" occasionally gives advance notice of the content of a new issue to attract more scholars, but what is this notice about?
Another proof of Goldbach's conjecture?
Is the author still Wang Hao?
Since it is clearly said to be another proof, it is definitely not a multi-vote one.
However, can Wang Hao use another method to prove Goldbach's conjecture?
(Ask for monthly ticket)
