I just want to be a quiet scholar
Chapter 298 I thought of it
Chapter 298 I thought of it
The most basic principle of being a teacher is not to mislead your students.
Shen Qi's performance during the transitional period was fairly qualified.
The most important thing in the near future is, of course, the International Congress of Mathematicians in late October.
With more than a month to go, Shen Qi was preparing nervously and orderly.
All the mission materials Jonas, Mary, and Ouye were in charge of were collected in Shen Qi's hands.
Shen Qi checked and checked them one by one, and entered the final stage of drafting.
"The first path that Jonas is responsible for is based on the twin matching method. Through the function log (s), the ∏L (s, Χ) is analyzed at point s=1 and is also equal to zero... so-so, Jonas is He is a nerve knife and his performance is unstable. Generally speaking, I will give him 60 points for the first path he is in charge of."
The derivation result provided by Jonas is not satisfactory, and Shen Qi needs to complete the remaining work of the first path of the third expression of RT by himself.
"The second path in charge of Mary, based on the Fundamental Theorem of Prime Numbers, she obtains a corollary to support the third expression of RT. She points out that when c is a constant that depends on A, and A>1, there is π(x ;q,l)=Lix/φ(q)+O(xe^-clogx)... Mary did a great job, I give her a 90."
Mary has helped Shen Qi a lot, and Shen Qi can directly use the important inferences she got.
"The third path that Xiao Yezi is in charge of is the most difficult. Find the important support for the third expression of RT through the zero-point equation... Oh, I found it!"
Ouye's information was sent to Princeton three days ago, after spending the night at Shen Qi's apartment, Ouye has returned to Columbia University.
Shen Qi carefully studied Ouye's information today, he was very excited, and he gave Ouye a score of 99.
Shen Qi made a phone call to Ouye: "Little Yezi, when T is not the ordinate of the zero point of L(s, Χ), did you complete the zero-point equation you obtained alone? Is Professor Gong's credit for it?" ?”
Ouye: "Professor Gong taught me."
"That is to say, most of the tasks you are responsible for are completed by yourself?" Shen Qi asked.
Ouye: "Almost."
"Why are you so good all of a sudden? This zero-point equation is very difficult. According to my preliminary judgment, you did a good job, almost perfect." Shen Qi was both surprised and delighted.
Ouye: "If you solve more equations, you will be proficient."
Shen Qi laughed loudly: "Yes, yes, there is nothing wrong! Solving equations requires uninterrupted practice. Recently, you have worked very hard to solve equations. I know this and I affirm it. Three days ago, you The apartment, unexpectedly..."
"I hate it!" Ouye said angrily on the other end of the phone, and then ordered: "I won't go to your place recently, and you don't come to me either, and prepare for the Philippine Award at ease."
"Okay, I will definitely not let you down, and I won't let the team down!" Shen Qi said firmly, ending the call with Ouye.
It took Shen Qi a week to complete the manuscript.
Shen Qi doesn't need much energy to integrate the information of Ouye and Mary, just sorting it out a little.
Shen Qi is mainly improving and supplementing Jonas' information.
Every project leader hopes that all of his subordinates will be elite soldiers, and these elite soldiers will always be in the peak academic state. The project leader only needs to do copy and paste work and it will be OK.
This is the most ideal setting, but the reality is often not ideal.
Therefore, in addition to having a far-sighted strategic vision, the person in charge of the project also needs to have strong tactical and practical capabilities.
Twenty days before the International Mathematical Conference, Shen Qi published a paper "Research on the Third Expression of RT" on arVix.
This paper has a total of 66 pages, and it is an update and supplement to the report that Shen Qi made in Italy.
In order to prove the Riemann Hypothesis, Shen Qi derived two core expressions. That paper made Shen Qi famous and he was promoted to the ranks of top international mathematicians overnight.
Riemann conjectures that the paper on the first two expressions has only 30 pages, while the paper on the third expression of RT has 66 pages, which fully demonstrates that the derivation process of the third expression is more complicated.
During this special period, any disturbance of the major candidates of the Philippine Award will attract the deep attention of the international mathematics and media circles.
Shen Qi published the latest research progress of the third expression of RT 20 days in advance, with the purpose of leaving some time for the international mathematics community to study his latest results.
"Shen Qi published the latest research results on the third expression of RT. In this 66-page paper, Shen Qi and his team obtained two inferences and a core equation of the third expression of RT through three paths. .This is a very important progress. Combined with the first two expressions proved by the Riemann Hypothesis, Shen Qi has almost locked in a Fields Medal.”—Comments and predictions from the American mathematics community.
"First of all, we must affirm the contribution made by Shen Qi, but the problem is that the third expression of RT has not been fully proved. The fourth path mentioned by Shen Qi at the Ramanujin Prize Reporting Conference is still Didn't see a single word."—Comments from the European mathematics community.
Shen Qi himself is responsible for the fourth most important path of verification of the third expression of RT.
Recently, Shen Qi stayed behind closed doors, leaving all the number theory courses for undergraduates to Professor Linden-Strauss.
He drank all the wine he could drink, burned all the draft papers that could be burned, and Shen Qi did not write any symbols about the fourth path.
"The mysterious ritual taught by Professor Wiles doesn't work at all."
What Shen Qi burned were all draft papers, and he was reluctant to burn the written official papers.
To solve mathematical problems, we should start from mathematics itself.
What wine to drink, what papers to burn.
Feudal superstition is harmful!
There is only one week left until the opening of the International Congress of Mathematicians.
Shen Qi doesn't drink alcohol or write papers, he returns to mathematics itself, number theory itself, and analytic number theory itself.
Mathematicians usually divide mathematics into pure mathematics and applied mathematics. Number theory undoubtedly belongs to pure mathematics, while analytic number theory is pure and pure.
A subject that is too theoretical is destined to be a toy for a very small number of people. They are lonely and lonely.
Analytic number theory, a super-hard analytical subject, is not popular in China. However, several of the most famous modern Chinese mathematicians are closely related to analytic number theory.
There are generally two schools of analytic number theory in China, one is the school of the Chinese Academy of Sciences with Mr. Hua Luogeng as the core, and the other is the school of Yan University with Mr. Min Sihe as the soul.
Another outstanding representative of the Chinese Academy of Sciences is Mr. Chen Jingrun. Gechai is a famous problem in analytic number theory.
Academician Lin, who specializes in number theory at Yanda Mathematics Academy, was under the tutelage of Min Sihe. He had exchanges with Shen Qi during the period when Shen Qi returned to China at the end of June.
"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 obtained by changing the whole function of ξ(s), and it is still in form is the whole function..."
Shen Qi recalled Academician Lin's point of view at that time.
"So we can try to imagine that in the process of traversing the complex plane, s happens to be impartial, and it is not more or less at a non-obvious zero point, that is, it coincides with the non-obvious zero point. The result is not difficult to guess. This formula The value of sub is 0, the third expression of RT proves..."
At this moment, the sky over Princeton suddenly became cloudy.
Rumble!
Thunder rang.
It rained heavily.
Shen Qi was jolted, and his brain captured a powerful inspiration like an electric shock.
"What academician Lin said is reasonable, but it needs to be supplemented and perfected to finally prove the third expression of RT."
"Haha, hahaha, I've already thought of how to perfect it..."
(End of this chapter)
The most basic principle of being a teacher is not to mislead your students.
Shen Qi's performance during the transitional period was fairly qualified.
The most important thing in the near future is, of course, the International Congress of Mathematicians in late October.
With more than a month to go, Shen Qi was preparing nervously and orderly.
All the mission materials Jonas, Mary, and Ouye were in charge of were collected in Shen Qi's hands.
Shen Qi checked and checked them one by one, and entered the final stage of drafting.
"The first path that Jonas is responsible for is based on the twin matching method. Through the function log (s), the ∏L (s, Χ) is analyzed at point s=1 and is also equal to zero... so-so, Jonas is He is a nerve knife and his performance is unstable. Generally speaking, I will give him 60 points for the first path he is in charge of."
The derivation result provided by Jonas is not satisfactory, and Shen Qi needs to complete the remaining work of the first path of the third expression of RT by himself.
"The second path in charge of Mary, based on the Fundamental Theorem of Prime Numbers, she obtains a corollary to support the third expression of RT. She points out that when c is a constant that depends on A, and A>1, there is π(x ;q,l)=Lix/φ(q)+O(xe^-clogx)... Mary did a great job, I give her a 90."
Mary has helped Shen Qi a lot, and Shen Qi can directly use the important inferences she got.
"The third path that Xiao Yezi is in charge of is the most difficult. Find the important support for the third expression of RT through the zero-point equation... Oh, I found it!"
Ouye's information was sent to Princeton three days ago, after spending the night at Shen Qi's apartment, Ouye has returned to Columbia University.
Shen Qi carefully studied Ouye's information today, he was very excited, and he gave Ouye a score of 99.
Shen Qi made a phone call to Ouye: "Little Yezi, when T is not the ordinate of the zero point of L(s, Χ), did you complete the zero-point equation you obtained alone? Is Professor Gong's credit for it?" ?”
Ouye: "Professor Gong taught me."
"That is to say, most of the tasks you are responsible for are completed by yourself?" Shen Qi asked.
Ouye: "Almost."
"Why are you so good all of a sudden? This zero-point equation is very difficult. According to my preliminary judgment, you did a good job, almost perfect." Shen Qi was both surprised and delighted.
Ouye: "If you solve more equations, you will be proficient."
Shen Qi laughed loudly: "Yes, yes, there is nothing wrong! Solving equations requires uninterrupted practice. Recently, you have worked very hard to solve equations. I know this and I affirm it. Three days ago, you The apartment, unexpectedly..."
"I hate it!" Ouye said angrily on the other end of the phone, and then ordered: "I won't go to your place recently, and you don't come to me either, and prepare for the Philippine Award at ease."
"Okay, I will definitely not let you down, and I won't let the team down!" Shen Qi said firmly, ending the call with Ouye.
It took Shen Qi a week to complete the manuscript.
Shen Qi doesn't need much energy to integrate the information of Ouye and Mary, just sorting it out a little.
Shen Qi is mainly improving and supplementing Jonas' information.
Every project leader hopes that all of his subordinates will be elite soldiers, and these elite soldiers will always be in the peak academic state. The project leader only needs to do copy and paste work and it will be OK.
This is the most ideal setting, but the reality is often not ideal.
Therefore, in addition to having a far-sighted strategic vision, the person in charge of the project also needs to have strong tactical and practical capabilities.
Twenty days before the International Mathematical Conference, Shen Qi published a paper "Research on the Third Expression of RT" on arVix.
This paper has a total of 66 pages, and it is an update and supplement to the report that Shen Qi made in Italy.
In order to prove the Riemann Hypothesis, Shen Qi derived two core expressions. That paper made Shen Qi famous and he was promoted to the ranks of top international mathematicians overnight.
Riemann conjectures that the paper on the first two expressions has only 30 pages, while the paper on the third expression of RT has 66 pages, which fully demonstrates that the derivation process of the third expression is more complicated.
During this special period, any disturbance of the major candidates of the Philippine Award will attract the deep attention of the international mathematics and media circles.
Shen Qi published the latest research progress of the third expression of RT 20 days in advance, with the purpose of leaving some time for the international mathematics community to study his latest results.
"Shen Qi published the latest research results on the third expression of RT. In this 66-page paper, Shen Qi and his team obtained two inferences and a core equation of the third expression of RT through three paths. .This is a very important progress. Combined with the first two expressions proved by the Riemann Hypothesis, Shen Qi has almost locked in a Fields Medal.”—Comments and predictions from the American mathematics community.
"First of all, we must affirm the contribution made by Shen Qi, but the problem is that the third expression of RT has not been fully proved. The fourth path mentioned by Shen Qi at the Ramanujin Prize Reporting Conference is still Didn't see a single word."—Comments from the European mathematics community.
Shen Qi himself is responsible for the fourth most important path of verification of the third expression of RT.
Recently, Shen Qi stayed behind closed doors, leaving all the number theory courses for undergraduates to Professor Linden-Strauss.
He drank all the wine he could drink, burned all the draft papers that could be burned, and Shen Qi did not write any symbols about the fourth path.
"The mysterious ritual taught by Professor Wiles doesn't work at all."
What Shen Qi burned were all draft papers, and he was reluctant to burn the written official papers.
To solve mathematical problems, we should start from mathematics itself.
What wine to drink, what papers to burn.
Feudal superstition is harmful!
There is only one week left until the opening of the International Congress of Mathematicians.
Shen Qi doesn't drink alcohol or write papers, he returns to mathematics itself, number theory itself, and analytic number theory itself.
Mathematicians usually divide mathematics into pure mathematics and applied mathematics. Number theory undoubtedly belongs to pure mathematics, while analytic number theory is pure and pure.
A subject that is too theoretical is destined to be a toy for a very small number of people. They are lonely and lonely.
Analytic number theory, a super-hard analytical subject, is not popular in China. However, several of the most famous modern Chinese mathematicians are closely related to analytic number theory.
There are generally two schools of analytic number theory in China, one is the school of the Chinese Academy of Sciences with Mr. Hua Luogeng as the core, and the other is the school of Yan University with Mr. Min Sihe as the soul.
Another outstanding representative of the Chinese Academy of Sciences is Mr. Chen Jingrun. Gechai is a famous problem in analytic number theory.
Academician Lin, who specializes in number theory at Yanda Mathematics Academy, was under the tutelage of Min Sihe. He had exchanges with Shen Qi during the period when Shen Qi returned to China at the end of June.
"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 obtained by changing the whole function of ξ(s), and it is still in form is the whole function..."
Shen Qi recalled Academician Lin's point of view at that time.
"So we can try to imagine that in the process of traversing the complex plane, s happens to be impartial, and it is not more or less at a non-obvious zero point, that is, it coincides with the non-obvious zero point. The result is not difficult to guess. This formula The value of sub is 0, the third expression of RT proves..."
At this moment, the sky over Princeton suddenly became cloudy.
Rumble!
Thunder rang.
It rained heavily.
Shen Qi was jolted, and his brain captured a powerful inspiration like an electric shock.
"What academician Lin said is reasonable, but it needs to be supplemented and perfected to finally prove the third expression of RT."
"Haha, hahaha, I've already thought of how to perfect it..."
(End of this chapter)
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