I Just Want to Be a Quiet Top Student

Yanda Mathematics Building.

Shen Qi talked cordially with Dean Wang, Professor Nian Ruiming, Professor Sun Erxiong, Professor Lu Guozhen and others.

Nian Ruiming, the former editor-in-chief and now the backbone of the Chinese Academy of Sciences, said with a smile: "Shen Qi, when you were studying at Yanda University, I published two papers in four major journals. Two papers in the four major journals. And you have published four papers in the four major journals, one for each, and a bowl of water is flat."

"Professor Nian, you know that reading the four conferences is addictive." Shen Qi used to admire Nian Ruiming, but now they are on equal footing.

Shen Qi’s mentor, Sun Erxiong, looked at Dean Wang and said, “Dean Wang, one of the four major journal papers can find an associate professor at Yanda University, and two papers can be a professor. Shen Qi has published four papers and can be a professor. What title do you give him?"

Dean Wang immediately made a decision: "If Shen Qi returns to Yanda Mathematics Institute to work, he doesn't need to be a lecturer or associate professor, and he will be your professor directly."

Professor Lu especially agrees: "Shen Qi, you go back to China through the channel of the 'Thousand Talents Program', and the country will provide housing and money to solve all problems. With your great achievements, you will immediately become an 'Outstanding Youth'. National major science and technology projects, 863, 973 , The National Science Foundation project directly puts you in charge."

Professor Nian made a suggestion: "The country attaches great importance to high-end scientific research talents, and the policy is very preferential. Shen Qi, don't hesitate, go back to Yanda."

"I'm definitely going back to China, my roots are in China." Shen Qi said confidently, and then said: "But not so soon, at least two or three years later."

"That's right, Princeton's mathematics professors have a strong brand and a great reputation. Shen Qi, if you became a professor at Princeton and were brought back to China, your status will be different. Yanda welcomes you back anytime, and will give you the best Remuneration, of course, the choice is yours, just do what you want." Dean Wang hoped that Shen Qi could return to his alma mater, Yanda University, to display his talents.

Either Shen Qi stayed abroad all the time, and once he returned to China, but did not teach or do research at Yanda University, then Yanda University would cut off friendship with him.

Later, a special academic seminar on "Riemann's conjecture and the third expression of RT" was held. Elite scholars from the School of Mathematics of Yanda University came out and discussed with Shen Qi how to solve the follow-up problem of the third expression of RT.

After the general meeting, there was a small meeting. The four academicians of Yanda Mathematics Academy, Wang, Lin, He, and Shang, gathered in a room. Their average age was over 60 years old. The four academicians were discussing major issues with a 22-year-old boy.

Academician Lin is the only one who focuses on number theory, but academicians Wang, He, and Shang are also masters of a generation of mathematics. They put forward some valuable opinions and suggestions from their own perspectives.

"Shen Qi, since you proved the Riemann Hypothesis and introduced the concept of the third expression of RT, I have been studying your twin matching method and the third expression of RT in theory." There is no specific job, the old man rides a broken bicycle around the Zhongguancun area all day long, he loves to play chess, but this mathematician's chess skills are mediocre, he loses more and wins less.

"Academician Lin, I would like to hear more about it." Shen Qi humbly asked for advice. Jiang was old and spicy, and he believed that Academician Lin must have valuable experience in number theory.

Academician Lin wrote a formula on the blackboard and said: "I derived this formula, where s is a variable, and it is a complex variable. We can clearly know that at zero point, this formula is completely passed through ξ(s ) is obtained by changing this whole function, and it is still a whole function in form.”

Shen Qi was dubious: "According to Academician Lin's deduction, so the variable s in this formula still has the right to traverse any position on the complex plane?"

"Shen Qi is really a genius." Academician Lin is very pleased. At his level, there are not many people who can understand him: "So we can imagine that in the process of s traversing the complex plane, s happened to be unbiased. Not leaning, no more, no less at a certain non-obvious zero point, that is, coincident with the non-obvious zero point, the result is not difficult to guess, the value of this formula is 0, and the third expression of RT is proved."

"This...is this proof?" Shen Qi couldn't believe it. The problem that had troubled him for several months was just so lightly solved by Academician Lin?

"Old Lin, even a layman in number theory can see that there are loopholes in your logic." Dean Wang focuses on the direction of reconciliation analysis. He calls himself a layman in number theory because he is self-effacing. He taught number theory when he was a lecturer.

"Old Wang, you are really a layman when it comes to number theory." Academician Lin was not happy.

"Old Lin, in the field of number theory in China, you and Lao Wu are the top experts, the duo of China's number theory, the contemporary Hua Luogeng and Chen Jingrun, but are you confused? Don't play chess with the folks under the flyover all day , Play chess, let’s play chess, Lao Lin, you are an academician after all, the most authoritative mathematician master, why can’t you beat others?” Dean Wang and Academician Lin have a very close personal relationship, and the two brothers have known each other since they were teenagers Yes, a lifetime of dealings.

"Playing chess with folks, I never use mathematical skills, playing chess is my hobby, how can you be lenient, old Wang?"

"Playing chess with folks is almost becoming your main business, Lao Lin!"

The two brothers, Lao Wang and Lao Lin, bickered, and Shen Qi died of anxiety: "Dean Wang, Academician Lin, can we stop arguing? I think Academician Lin still has something to say about the third expression of RT. "

"Shen Qi, I just love to talk to you about serious matters. You are the smartest." Academician Lin ignored Dean Wang, and he said to Shen Qi with a loving face: "Come back to business, let's assume that this point belongs to Because of the set {ξ function is not obviously zero point}, according to the principle of 'Shen's twin matching method', then naturally the overall product value of this group must be 0."

"Academician Lin, but the problem is, since s has traversed to the two zero points of the kth twin group, then I and II are contradictory! In other words, x is equal to βk, γ=γk, and x=1-βk, γ =-γk, these two cases are difficult to rewrite into the form of ordinary equations, the third expression of RT has not been proved...and I don’t think that the formula you wrote on the blackboard is the third expression of RT theoretically style." Shen Qi stared at the blackboard, his eyes fixed: "It's more like a...Lindelof style?"

"Shen Qi, it's very valuable for you to have a skeptical spirit. There are not many young people who dare to question academicians these days." Academician Lin admired Shen Qi so much, he unfolded his happy folds: "Yes, it is a variant version. Lindelof formula, I personally think that to obtain and prove the third expression of RT, we must start with the variant version of Lindelof formula. The third expression of RT is not a problem of Shen Qi alone, we These mathematicians have come up with suggestions. Personal opinions are for reference only.”