The report meeting is over, and the influence continues to ferment.
Many top scholars were interviewed and immediately stated that they were sure that the Riemann Hypothesis had been proven.
"I understand everything."
"I listened to the whole process from beginning to end, and I didn't find any problems. All the logic was a perfect closed loop."
"I don't think there is any need to judge anymore. The Riemann Hypothesis has been proven. This is a fact. But I think the Riemann Hypothesis may not be important. What is important is the high-order particle function.
"Wang Hao is a very good speaker and his explanations are very clear. I didn't understand some of the content before I came here, but now I understand everything.
"Now, I can say with great certainty that the Riemann Hypothesis has become the Riemann Theorem.
The top scholars who were interviewed by reporters all said the same thing. They very much recognized the content of the report and were very sure that the Riemann Hypothesis had been proven.
This may sound normal, but it's actually quite surprising.
It is not easy for a report on the world's top mathematical problems to be recognized by so many top scholars.
For example, Andrew Wiles gave a report on Fermat's conjecture at the Newton Institute. After the report, he celebrated with champagne, but no top mathematician came forward to confirm that the content of the report was completely correct.
Later, Andrew Wiles submitted the paper for publication, and several issues were pointed out by reviewers.
It's different now.
Many scholars who listened to the report were very sure that the Riemann Hypothesis had been proven, including several Fields winners and other very influential scholars.
In fact, the difference is that Wang Hao published the paper first and then made the report.
In addition, the paper he published is very attractive, because it is not a proof of the Riemann Hypothesis alone, but the Riemann Hypothesis is just a side result, and the study of the first problem of higher-order particle functions is the core.
Higher-order particle functions are the latest research direction, which naturally attracts the attention of scholars.
In this way, many scholars will spontaneously study the content of the paper instead of simply wanting to test the correctness of the proof.
After they have done a certain amount of research, and then go to the demonstration report, they only need to understand what they don't understand, and it will become much easier relatively naturally.
Facts have also proved that the scholars' judgment is correct.
Just three days later, the Institute for Advanced Study at Princeton University announced that it recognized Wang Hao’s proof of the first problem of higher-order particle functions and the Riemann Hypothesis.
When Princeton University's Institute for Advanced Study released the news, a spokesperson was interviewed. "The research team we established unanimously believes that the proof is completely correct."
"The Riemann Hypothesis is already a thing of the past, and it will become a new theorem in mathematics."
"This is an exciting moment!"
"At the same time, we believe that the most valuable thing is the proof of the first question of Wang's function. It also provides a guideline for the study of number theory.
Later, the Erfurt Academy of Sciences in Germany also released news approving the certification process.
After that, Newton Institute, Fenlan National Academy of Sciences, Royal Swedish Academy of Sciences.
etc.
It was not until a week later that the Clay Mathematics Institute also released news confirming the correctness of the proof.
The speed determined by the Clay Mathematics Institute is slower, but the mathematical community can understand it, because they not only confirm the proof, but also need to award one million US dollars to Wang Hao as the solution to the seven major mathematical problems of the millennium.
bonus.
A spokesman for the Clay Mathematics Institute was very generous. He said, "We are very pleased to once again see someone win the million-dollar prize for the Millennium Mathematics Problem."
"Interestingly, we have already awarded it once, and it was to him for NS issues."
"Now it's for the Riemann Hypothesis."
"That's amazing, amazing, amazing... I hope we can award it more often, so that we can promote more development of mathematics..."
.
.....
When the proof of the Riemann Hypothesis was confirmed, public opinion became heated.
Wang Hao is naturally at the center of public opinion.
He has made too many personal achievements in the field of mathematics. The top achievements include Goldbach's conjecture, NS equation problem and Riemann's hypothesis. Some of the lesser achievements include the hail conjecture, the study of Mersenne prime numbers and the demonstration of Artin's constant.
,etc.
The Riemann Hypothesis is very meaningful. It belongs to Hilbert's eighth problem and is also one of the seven major mathematical problems of the millennium.
Wang Hao personally completed two of the Seven Millennium Mathematics Problems, and also completed two of Hilbert's Eighth Problems - Goldbach's Hypothesis and Riemann's Hypothesis.
Therefore, many people in public opinion say, "Across the world, if you want to solve the remaining mathematical problems, you still have to rely on the great master Wang Hao!"
"There are still four Millennium Problems left. I wonder which one Wang Hao will solve next?"
"Maybe it's the twin prime conjecture! Hilbert's eighth problem mainly includes three problems, Goldbach's conjecture, Riemann's conjecture and the twin prime conjecture. If we solve the twin prime conjecture, the great master Wang Hao will have completed all the prime number problems.
.”
"Now that the Riemann Hypothesis has been completed, Wang Hao can be said to be the "first person in number theory"!"
The ancients said that literature is not the best.
Even in the field of mathematics, there are many branches, and it is difficult for scholars in different fields to make comparisons.
But in the field of number theory, Wang Hao's achievements include Riemann's conjecture, Goldbach's conjecture, Hail conjecture, demonstration of Artyn's constant, computational methods to find Mersenne primes, etc.
Each of the above results taken individually is definitely the best in the world, and all added together
Unthinkable!
Therefore, public opinion can clearly say that Wang Hao is the first person in the direction of number theory.
At the same time, some top mathematicians also stood up and said that the proof of the Riemann Hypothesis was only a "side result," and "it (Riemann Hypothesis) just attracted a lot of attention."
"But in fact, the biggest achievement is the proof of the first problem of higher-order particle functions. The study of the intersection complex plane is much more important than the Riemann Hypothesis, and it also has great significance for future research in the direction of number theory.
"
"It can be said that the higher-order particle function guides a number, the general direction of prime number research, a very promising general direction!"
In addition to Wang Hao who is constantly praised and sought after, Ding Zhiqiang and Qiu Hui'an also benefited from the influence of their achievements and became very famous scholars. They have also become the focus of heated discussions.
Although Ding Zhiqiang and Qiu Hui'an are only participants in the research, and their contributions are definitely not as good as Wang Hao's, Wang Hao is already very famous, and there is no point in discussing them.
Ding Zhiqiang and Qiu Hui'an are different. They are the new focus, and they are still studying for Ph.D.s. They have a lot of public opinion potential to be tapped.
There is the most discussion about Ding Zhiqiang, and he has a very interesting "public opinion reversal".
In the previous report meeting on higher-order particle functions, Ding Zhiqiang stood up and explained his thoughts. However, even in the international mathematics community, very few scholars cared about it, and the public opinion was even more one-sided. They thought that it was just Wang Hao who was training students.
Let students express their opinions in public.
That's all.
Now it is a 'reversal' proof that Ding Zhiqiang's idea is very important, important enough to help prove the Riemann Hypothesis.
This reversal is talked about by public opinion.
Qiu Hui'an is worse in comparison. He doesn't have any hot spots in public opinion. He only fulfilled Legendre's conjecture. His personal resume is relatively better and he is considered to have "promising prospects."
The workshop of the Mason Number Laboratory.
Ding Zhiqiang and Qiu Hui'an were sitting together, talking about public opinion with excitement and excitement, and talking about some news reports related to themselves.
By the way, we also talked about the future.
Ding Zhiqiang said with a smile on his face, "There must be many colleges and universities inviting you, right? I also received a lot of emails.
The last sentence is the key. He then said eloquently, "Academician Qiu Chengwen invited me to the Mathematical Science Center of Shuimu University. Let's talk about it.
Sign a formal work agreement, work for two years, and accumulate enough teaching hours, you can be promoted to professor."
"There are also Capital University and Jinkai University. Maybe they know that I want to go home?"
"There are also invitations from two foreign universities. Did you see it? Princeton University! They said they invited me to come over for a visit and a job interview. If I go there, I should be able to be hired as a professor, right?"
"And Penn State University
Ding Zhiqiang kept talking, and he received a lot of invitations, including high-efficiency companies at home and abroad, some professional academic institutions, and even the Institute of Mathematics of the Academy of Sciences.
Qiu Hui'an said calmly, "Me too. They all received similar invitations.
The report just completed is so important. It not only solved the Riemann Hypothesis problem, but the results of higher-order particle functions are even more important and are also considered to be an important direction of number theory.
To be continued...