I Just Want to Be a Quiet Top Student

For the convenience of Shen Qi, the meeting place of the special academic exchange meeting "Proof of the Riemann Hypothesis Based on 'Twin Matching Method'" is located in the Princeton Department of Mathematics Building.

On the last day of May, Shen Qi entered a conference room in the Mathematics Department of Pudong University. He arranged everything, wiped the blackboard, and connected the projection equipment to the computer.

Shen Qi attaches great importance to this special academic exchange meeting. Once the experts are satisfied, the "Proof of the Riemann Hypothesis Based on the 'Twin Matching Method'" will be officially recognized by the IMU and the international mathematics community.

what does that mean?

Shen Qi could still imagine with his eyes closed, so many small achievements, so many small points.

It is expected to reach level 13 in one wave.

The door of the conference room was pushed open, and Mary led 11 experts in number theory into the venue. She made a cheering gesture to Shen Qi, then exited the conference room and closed the door.

The grand jury only asked questions to Shen Qi alone, and Shen Qi greeted the experts with a smile. This is his home field: "Welcome to the Princeton Department of Mathematics Building above all else... Hey, Professor Maynard ?”

Maynard, a British mathematician at Oxford University, does not belong to the Princeton system, nor is he Chinese. He is a top young number theory master in the world, and he meets the criteria for being selected for the jury.

"Hello, Shen, we meet again." Maynard shook hands with Shen Qi.

"Hello, Professor Maynard." Shen Qi only now learned that Maynard is one of the review experts.

The 11 digit theory experts of the Grand Jury come from 9 different countries in Asia, Africa, Latin America, Europe, America and Australia. Vladimir Kabrovsky from Moscow State University."

"Professor Kabrovsky, hello, it's a great honor to meet you!" Shen Qi warmly shook hands with Kabrovsky. This Russian old man is a character. He has been famous in the mathematics circle since the Soviet era.

Kabrowski was a student of Demidovich and participated in the revision of the new edition of Demidovich's Workbook.

"Dimidovich Exercises" is a set of math problems. The head of the Russian little old man is very comprehensive. He is proficient in everything from numbers to numbers and number theory.

Kabrowski introduced the members of the jury one by one: "Jerry Carrick, a Canadian mathematician from the University of Waterloo."

"Julio Rodriguez, a Brazilian mathematician from Berkeley."

"Tim Wilson, an Australian mathematician from Cambridge."

"Mia Arsim, Egyptian mathematician, from the Ecole Normale Supérieure."

"Kenji Nakamura, a Japanese mathematician from the University of Tokyo."

"Roy Sabathin, Indian mathematician, from the University of Manchester."

"James Maynard, it looks like you know each other, so I won't introduce you."

...

Eastern Europe, Western Europe, North America, South America, Africa, Asia, Oceania, except for Antarctica, all other continents on the earth sent representatives. They gathered from all over the world to represent the people of the earth to test Shen Qi.

Wow, the lineup of this big jury is too luxurious... Shen Qi is a little excited. The IMU and the editorial department of "Acta Mathematica" did a good job of keeping secrets beforehand. Shen Qi only knew now that it turned out to be these eleven bosses. .

Except for Maynard, Shen Qi had never met the other ten bosses before, but he had already heard of the names of these eleven bosses, and had read the exercise books written and edited by them, quoted their papers, and read their monographs.

The Princeton Department of Mathematics sent all the number theory elites, and had to second a number theory expert from the Institute for Advanced Study to fight against the 11-member international number theory jury.

The review opinions of the big jury are of the highest authority, if they approve, then Shen Qi will be relieved.

After the pleasantries, we went straight to the topic.

Shen Qi knew in his heart that the Breakthrough Prize report in March would be a show, and today was the real test.

"Professor Kabrowski, should I make a statement first, or do you ask questions directly?" Shen Qi asked.

Kabrowski said: "Shen, you state first. During your statement, we may interrupt you at any time and ask questions."

Shen Qi started to play the PPT of "Proof of the Riemann Hypothesis Based on the 'Twin-Matching Method'". After 5 minutes of presentation, someone asked a question.

Maynard was the first to ask: "Shen, according to your definition, R in this page is the residue of g(s) at the pole between the two perpendicular lines σ=-2k-3/2 and σ=3/2 , which is also the basis for your first expression. According to our continuous two-month research, we believe that your first expression cannot withstand scrutiny, and it is contrary to the Hardy system."

I knew you would ask that!

Obviously, Maynard, you guys have studied hard for two months, and you came prepared, right for me?

Shen Qi noticed a detail. When Maynard said "we", two of the other 10 experts shook their heads, two agreed, and the other six were neutral.

This shows that there may be differences within the jury on the question Maynard raised.

The two experts who shook their heads were the team leader Kaburovski and the Brazilian mathematician Rodriguez. It seemed that they did not agree with Maynard's point of view. On the contrary, Kabrowski and Rodriguez should support Shen Qi on the issue of system theory.

The two who agree with Maynard are Australian mathematician Wilson and Indian mathematician Sabathin, that is to say, they do not approve of Shen Qi's system setting, and have doubts about Shen Qi's first expression.

The attitudes of the other six people were not clear, they were waiting for Shen Qi's answer.

Riemann guessed that for such a big matter, it is normal to have differences, debates, and doubts.

This is why the number of members of the jury is set to an odd number. If it is not possible, just vote.

It's interesting, Maynard, Wilson, and Sabathin are British, Australian, and Indian respectively, and they all teach in prestigious British schools, so they are not in the same group... Shen Qi smiled, The main contradiction is obvious. The first problem is to solve Maynard, Wilson, and Sabathin.

"Professor Maynard, I think the Hardy system is outdated." Shen Qi said.

"No, no, Hardy's classic system will never be outdated." Maynard was a little unhappy. Although he is from Oxford and Hardy is from Cambridge, but leaving the British Isles, no matter Oxford, Cambridge or Manchester, it is Great Britain of.

"I have great respect for Hardy himself. He is an outstanding British mathematician and the teacher of Hua Luogeng, the founder of modern Chinese mathematics. However, it is limited to the Riemann conjecture. I think Hardy's system is outdated."

Shen Qi insisted on his point of view. He walked to the blackboard, picked up the chalk, and said: "Mathematics knows no borders, and the truth is always supreme. I will explain in detail below. Hardy's system is not applicable to the proof of Riemann's conjecture. It is outdated." gone."

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Third watch, basic exercises, sit down, don't 6.

Also, 5 days, monthly pass, quick vote.