Rule department scholar

"Edward, don't be ashamed, come down! No one is interested in your string theory now..."

Mathematicians don't care about discipline or discipline, and many people shout at the top of their voices, which really doesn't change any face.

Edward Witten was suddenly embarrassed.

Zhao Yi said, "Everyone, be quiet, this afternoon is my (time)."

……

At noon, a lot of people were discussing Edward Witten, and said a lot of nonsense to him, feeling very dissatisfied.

If you are a mathematician who is obsessed with string theory, you will definitely feel the mood of Edward Witten and feel the beauty of the process of mass point shaping.

Unfortunately, most mathematicians do not work on string theory.

In the afternoon, Zhao Yi came to the stage.

He directly wrote the three sets of formulas obtained, and then proceeded with a series of expositions.

Zhao Yi's explanation was more critical. He contacted the Riemann function and used topology to conduct a series of explanations and derivations.

It's much more normal now.

After the explanation was over, people in the audience also asked questions normally.

Zhao Yi explained a lot of content, and it was not easy to fully understand it, but all the top mathematicians sat in the audience, and some detailed issues had to be deliberated, so the overall grasp was not a big problem.

During the question time at the end of all reports, some people stood up and asked about the details of the derivation.

The first day of reporting ended with many people raising their hands to ask questions.

The next day came.

The large conference room in the mathematics center was already overcrowded, and many people gathered together to discuss boycotting Edward Witten.

"That guy Edward, if he talks about string theory again, we can protest by leaving."

"Wait until everyone in the venue has left, and see what he still says about string theory!"

"What he said yesterday has nothing to do with Riemann's conjecture. I don't know how it is today? I still feel that Zhao Yi is more reliable."

"..."

Edward Witten also knew that he seemed to be outraged by the public. He had to check out the "part that promotes the wonderful mathematics of string theory". Canonical analysis of columns.

This part of the research is aimed at the normative analysis of the mass point topology.

Now there is no way to continue to introduce quality points, and the difficulty has actually dropped a lot. You only need to directly understand the specifications for columns.

In the afternoon, Zhao Yi continued to do relevant analysis.

This part is the most difficult, and it can be said to be the core of proving Riemann's conjecture. Their explanations are very detailed, and I hope that those who come to the report meeting can understand it.

Obviously.

The two of them slightly overestimated the abilities of others.

Although their explanations are very detailed, those who can fully understand the process are only a very small number of top mathematicians, and most of the others do not understand.

When it was time to answer questions, many people raised their hands to ask questions.

The Q&A time in the afternoon was planned to be one hour, but it turned out that the Q&A lasted for two hours. Edward Witten felt like he had explained the whole thing by himself, and he felt very tired just by answering the questions.

The last day is key.

In the morning, Edward Witten made a specification based on Fermat's theorem, ended the numerical law, and analyzed the behavior of the Riemann zeta function ζ(s).

This part of the content is very complicated, and it is very difficult to follow the train of thought during the derivation process one by one. Edward Witten explained it very patiently, showing the confidence of a top mathematician, and explained every step clearly.

In the afternoon, Zhao Yi did finishing work.

Based on the conclusion in the morning, combined with other content, he quickly constructed the equation. After a series of derivations, he proved that the constructed equation has the same meaningful solution as the Riemann function expression ζ(s)=0, because The equation is constructed from the solutions fixed in the region, and it can be deduced that all meaningful solutions of ζ(s)=0 are on a straight line.

This is the result.

The main proof content of the Riemann Hypothesis is to prove that all meaningful solutions of the equation ζ(s)=0 are on a straight line.

After everything was finished, Zhao Yi looked down from the stage and smiled slightly, "Above."

"...It is the proof that I am with Mr. Edward Witten!"

Accompanied by Zhao Yi's concluding remarks, the audience thought of the sparse applause, and the applause quickly gathered together, and everyone applauded fiercely.

In fact, there are not many people who can fully keep up with the rhythm, but mathematicians who can understand have determined that there are no major problems in the process. As long as there are no major problems in the process, the calculation and derivation can be verified slowly later.

Edward Witten was in charge of the next question and answer time, and some people sent congratulations in advance, "I listened to the whole process, and there was no problem at all, which proves that the thinking is very clear."

"While some derivation steps are complicated, overall it's perfectly fine."

"It's unimaginable that I can still see the Riemann Hypothesis proved in my lifetime!"

"This will be hard to come by in a hundred years, the greatest progress in mathematics, but I am not surprised that you and Edward are together, and everyone else thinks so."

"congratulations!"

"Congratulations on completing the Riemann Hypothesis, I believe history will record this moment!"

"..."

……

The report will end.

Whether Riemann's conjecture will be proven is not a certainty, because no one else can be 100% sure that it is correct after listening to the three-day report. The details still need to be refined and researched.

Internationally, the proof of some mathematical conjectures requires the voice of top mathematical institutions.

For example, Princeton Institute for Advanced Study, Newton Institute and so on.

These institutions will organize special teams to conduct detailed research and analysis on the proof process, point out errors if they are found, and publicly say, "believe in the conclusion" if no errors are found.

When more influential academic institutions have recognized the proof process, they will be 100% sure that the conjecture will not be proved.

There are some things that don't take institutional accreditation into account.

Together with Edward Witten, Zhao Yi confirmed the English version of the magazine ---

Annals of Mathematics.

"Annual of Mathematics" is the most influential and authoritative mathematics journal in the world. Even among the four top mathematics journals, "Annual of Mathematics" can be said to be ranked first.

One is because of high influence.

Another reason is that because of the small number of published papers, the "Annual Journal of Mathematics" publishes an issue every two months, and the overall number of papers published each year is limited to less than [-].

One hundred articles is the limit.

In fact, in the past few years, the average number of papers published by "Annual Journal of Mathematics" per year has not exceeded [-], and occasionally there are too few papers, and the printing time of the new issue is delayed.

"Annals of Mathematics" will publish physical papers, and will also issue corresponding electronic versions. The electronic version is also charged. Only when the papers have been published for five years can they be downloaded and used for free.

The grade of "Annual of Mathematics" is still very high, but compared to Zhao Yi and Edward Witten, it is nothing at all.

Even if the proof of Riemann's conjecture has not been recognized by the institution, or even a report meeting, they have already 'scheduled' the publication of the paper, and their manuscript has been sent, and there is no need to modify it at all. There are some minor problems. will be modified directly.

As for whether the thesis is correct or not...

The editorial department of "Annual of Mathematics" didn't consider it at all, and it didn't even matter if it was wrong, just because the publishers were Zhao Yi and Edward Witten.

This is the influence of top mathematicians.

……

The report meeting of Riemann's conjecture really made the Mathematics Center of Yanhua University lively for a while.

Although the report lasted only three days, mathematicians stayed here for the following week to discuss mathematical issues with their peers. The Mathematics Center of the Faculty of Science became a place for them to communicate in mathematics.

Zhao Yi also stayed at the Mathematical Center, and it was a very rare opportunity to have discussions related to mathematical theory with so many top mathematicians.

Meanwhile, the math center has good news.

On the second day after the report meeting, Wiles found Zhao Yi and said that he was very excited about coming to work at Yanhua University and hoped to join the Mathematical Center.

"Welcome!"

"We will be colleagues from now on!"

Zhao Yi said very enthusiastically, he immediately told the news to the academic affairs, the person in charge of the School of Science and logistics, and asked them to help arrange Wiles.

It is definitely good news that Wiles has agreed to join the Mathematical Center.

In the mathematics center of the Faculty of Science, Zhao Yi was the only one who 'supported the scene', and the others were not well-known mathematicians.

Zhou Li is already top-notch.

Obviously.

Zhou Li and Wiles are not at the same level. Wiles' Fermat conjecture proved to be wrong, but it cannot be denied that his mathematical ability is definitely the best in the world.

Now that Wiles has joined the mathematics center, it means that there is another "great god". Wiles will undoubtedly bring great help to the mathematics center in the field of education. Perhaps under his guidance, the mathematics center will be able to cultivate Get your own Fields winner.

In the past few days, Wiles' mood has been very ups and downs. It is not easy to make a decision that he never thought of.

Zhao Yi's invitation moved his heart.

If he hadn't experienced failure, Wiles would definitely not consider working in China, because China is a completely strange country to him.

It's different now.

Wiles doesn't even want to go back to country Y, so coming to China is a good choice, at least there won't be too many people, always pointing at him and saying, "Look! That loser, liar!"

"He said he proved the Fermat conjecture, and he lied to the whole world!"

Actually?

Wiles believed he was right until proven wrong.

He's a loser, but not a liar.

Wiles thought of coming to China to work and a new environment, and he was full of yearning for a new life. He thought, "Maybe I can do research with Zhao Yi in the future? To complete a certain world-class achievement together?"

He began to look forward to it.

Zhao Yi didn't pay much attention to Wiles.

After all the reports were over, he refocused his energy on anti-gravity research, and he was still engaged in theoretical work.

It's not that the theory will continue to be perfected, the main reason is that several people in the theory group can't understand his research for a short time.

So Zhao Yi will go there in person.

Chapter 556 The anti-gravity device is exposed!

Zhao Yi had already prepared for Zhang Qican, Huang Zhong, and Ruan Wenye's inability to quickly understand the new sequence, because the difficulty was too high.

The theoretical content is all researched by him, but many of the "Law of Karma" and other abilities used in it, many small details have been skipped, it is really not easy to slowly deduce and understand.

Zhao Yi's understanding of the content is also based on causal thinking, and if he deduces it slowly with logical thinking, the content is really too much.

This is probably also because the theories about space are all researched by him himself, and have not been systematically sorted out.

The mathematics and physics that can be learned now have many formulas and definitions, which is equivalent to learning on the basis of predecessors, without having to investigate the source of each formula and definition.

The theory of space is different.

Because it has not been systematically sorted out, the content inside needs to be understood from the basics, and it will become very complicated as long as it is slightly expanded, not to mention that his latest research involves thirteen complex columns. The solution is all a "small mathematical conjecture" difficulty.

If several people in the theoretical group are allowed to understand the content together, it may not be possible to understand everything in a few months or a year.

On the way to the residence of the theoretical group, Zhao Yi was thinking about the issue of "systematic arrangement". One advantage of "systematic arrangement" is that after arrangement, others can learn based on conclusions (formulas and definitions). Participate in research, not even the basics.

The downside is...

Content can easily leak out!

A lot of complicated derivations and calculations, even if they are all leaked out, it is not easy for others to understand. It probably requires the top mathematicians, and it takes a few years of research.

It is relatively much easier to switch to the conclusion after sorting out.

For example, Newton's theorem.

As long as you know Newton's theorem, you can understand its meaning and apply it. You don't need to know how Newton's theorem was developed.

However, Zhao Yi still decided to apply to add more manpower to the theory group, and systematically sort out space-related research content, because the research cannot be done by himself, space mathematics is a new system, and his energy alone is limited. , no matter how efficient it is, it is impossible to complete the research of a system.

"You should still apply!"

"To sort out the basics, start from now. The theory group should do this work. Only when more people participate in the research can academic development be possible."