I just want to be a quiet scholar
Chapter 322 You Have Changed, You Don't Like Pretending To Be B (3 More)
Chapter 322 You Have Changed, You Don’t Like Pretending To Be B (Third)
Shen Qi received the Ostrovsky Medal and a prize of [-] Swiss francs.
The A-level Ostrovsky Award contributed 90 Xueba points to Shen Qi, and the progress of Task 4 was 5/[-].
This is the ninth mathematics award that Shen Qi has won in three years. Except for the Abel Prize, the Wolf Prize and other awards that are usually only given to the old man, Shen Qi won all the other major mathematics awards.
Facts have proved that the Riemann conjecture, a millennium problem, is enough for Shen Qi to eat for a lifetime.
The 23-year-old Shen Qi is still very young, and he is not satisfied with relying on a Riemann conjecture for the rest of his life.
However, it cannot be denied the significance of deciphering the Riemann Hypothesis, as well as the systematic new theoretical support it brings.
With the support of the Riemann zeta function prime number distribution theoretical system, Shen Qi proved Ge Guess logically, proving this mathematical problem that has stumped mathematicians all over the world for more than 200 years.
This is invincible?
Rare match?
Math maxed out?
No.
For the remaining five millennium problems, Shen Qi currently has no countermeasures and cannot solve them.
In addition to cross-border problems such as P versus NP problems, Yang-Mie equations, and NS equations, Shen Qi has no way to solve purely mathematical problems such as Hodge's conjecture and BSD.
Hodge's conjecture is a problem of algebraic geometry, and BSD is a problem of number theory about Diophantine equations.
After solving Li Chai, Shen Qi solved Ge Chai smoothly, but he couldn't solve BSD smoothly.
There is a long way to go, there is no end to learning, and the road to upgrading will continue.
Invincible how lonely is everyone's ultimate goal.
Shen Qi is a little lonely now, not super lonely.
At the academic exchange meeting after the award ceremony, Shen Qi had a cordial conversation with two friends: "Professor Kabrowski and Professor Sabasin, we meet again."
"Your progress is amazing. More than a year ago, you were a doctoral candidate at Princeton, and now I should call you Professor Shen." Russian mathematician Kabrovsky, who received this year's Olympic Games together with Shen Qi Strovsky Medal.
Kabrowski's award is based on his contributions to the field of numerical analysis, and he is also an expert in number theory.
In the first half of last year, an 11-member jury led by Kabrowski went to the United States, and the review passed Shen Qi's proof of Riemann's conjecture.
Since then, Shen Qi has soared into the sky. Six of the nine mathematics awards he won came from more than a year after the Riemann conjecture proof was recognized by the jury, including the highest honor Fields prize.
Shen Qi was grateful to Kabrovsky: "Professor Kabrovsky, if I have the opportunity, I will definitely visit Moscow."
Professor Kaburovski welcomed: "You are so young, you should come to Moscow to have fun. Moscow is a paradise for young men."
"I can testify to this. I have been to Moscow three times, and every time I linger. In contrast, Manchester is boring." Indian mathematician Sabasin smiled that men can understand. He is a professor at the University of Manchester. Came from the UK to participate in this academic exchange.
At the Riemann Hypothesis review meeting more than a year ago, Sabasin first made things difficult for Shen Qi, and then became a fan of Shen Qi. His evaluation of Shen Qi was: a person with a genius brain and devil logic.
"So Professor Shen, it took you more than half a year to prove Goldbach's conjecture, which is really remarkable." Sabasin saw Shen Qi's paper on the proof of Goldbach's conjecture on arVix, and in fact, the whole world saw this public Paper from a week ago.
"It was conceived for half a year, and the draft was completed within a week." Shen Qi said.
"Devil." Sabasin spit out a word in a daze.
"The reminiscence time is over, let's ask Mr. Devil to tell us about his proof ideas."
Kabrowski and other mathematicians sat down to listen to Shen Qi's report on the Gechai proof.
"I believe everyone has read my paper published on arVix. Eight lemmas are the framework, eight definitions are the premise, one equation is the core, and four conjectures are the results." Shen Qi quickly entered the speech state.
"Here, I only focus on the proof process of Goldbach's conjecture, and the proofs of the other three conjectures refer to Goldbach's conjecture."
"I will briefly talk about Lemma 8 among the eight lemmas. The first seven lemmas are all recognized correct propositions, and Lemma 8 is proved by myself."
"Please look at the screen. According to Lemma 7, through the method of contradiction, it is intuitively proved that if a is an algebraic number and θ is a transcendental number, then the product aθ of a and θ must be a transcendental number. This is Lemma 8."
"I'll focus on eight definitions and one core equation next."
"Definition 1: f(x) = ρx + b, let ρ∈Q, b∈z."
“定义2:g(x)=1+Γ(x)/x+1+1+Γ(2n-x)/2n-x,令n∈Z+。”
"Definition 3: Let h(x) = cosβ(x) + sinβ(x) = cosg(x)π + isinf(x)π."
"Please note that the first three definitions are very important. If you remember the twin matching method in Riemann's conjecture and the second expression of ζ(s), then these first three definitions can support the core equation."
“请看核心函数构造方程:cos(1+Γ(x)/x+1+Γ(2n-x)/2n-x)π+isin(ρx+b)π=-1
. "
Shen Qi said this in one breath, he was thirsty, he paused to drink some water, and left some time for the mathematicians present to understand his thinking.
"Obviously, finding the solution of this function construction equation is equivalent to proving the 1+1 problem of Goldbach's conjecture." Professor Sabasin said, in fact, he has read Shen Qi's paper, and knows that Shen Qi has solved the equation solution.
Everyone just wants to hear from Shen Qi himself, yes, that's right, the solution of this equation is...
"Yes, that's right." Shen Qi felt refreshed after drinking the mineral water and wanted to drink another bottle.
"People will definitely ask, three definitions seem to be enough, why should I define eight?"
Shen Qi switched to the five definitions on the next page and said: "Europe is the center of world football. Everyone must like to watch football matches. At the most critical moment, it is not safe for Cristiano Ronaldo to score three goals. He Eight goals have to be scored for Portugal to have any hope of beating Spain."
Ha ha.
The mathematicians laughed and got it.
Academic exchanges will be conducted in a relaxed and harmonious atmosphere.
When Shen Qi was a doctoral student, even as a doctoral student at Princeton, some people made things difficult for him, trying to keep him from stepping down.
Shen Qi has won nine mathematics awards, one of which is the Fields Medal. All the mathematicians present here can do is to listen, put forward objective opinions and questions, communicate in a friendly manner, and live in harmony.
Status and respect need to be won by oneself, Shen Qi calmly answered the questions of mathematicians, and there were many reporters waiting outside the meeting room.
(End of this chapter)
Shen Qi received the Ostrovsky Medal and a prize of [-] Swiss francs.
The A-level Ostrovsky Award contributed 90 Xueba points to Shen Qi, and the progress of Task 4 was 5/[-].
This is the ninth mathematics award that Shen Qi has won in three years. Except for the Abel Prize, the Wolf Prize and other awards that are usually only given to the old man, Shen Qi won all the other major mathematics awards.
Facts have proved that the Riemann conjecture, a millennium problem, is enough for Shen Qi to eat for a lifetime.
The 23-year-old Shen Qi is still very young, and he is not satisfied with relying on a Riemann conjecture for the rest of his life.
However, it cannot be denied the significance of deciphering the Riemann Hypothesis, as well as the systematic new theoretical support it brings.
With the support of the Riemann zeta function prime number distribution theoretical system, Shen Qi proved Ge Guess logically, proving this mathematical problem that has stumped mathematicians all over the world for more than 200 years.
This is invincible?
Rare match?
Math maxed out?
No.
For the remaining five millennium problems, Shen Qi currently has no countermeasures and cannot solve them.
In addition to cross-border problems such as P versus NP problems, Yang-Mie equations, and NS equations, Shen Qi has no way to solve purely mathematical problems such as Hodge's conjecture and BSD.
Hodge's conjecture is a problem of algebraic geometry, and BSD is a problem of number theory about Diophantine equations.
After solving Li Chai, Shen Qi solved Ge Chai smoothly, but he couldn't solve BSD smoothly.
There is a long way to go, there is no end to learning, and the road to upgrading will continue.
Invincible how lonely is everyone's ultimate goal.
Shen Qi is a little lonely now, not super lonely.
At the academic exchange meeting after the award ceremony, Shen Qi had a cordial conversation with two friends: "Professor Kabrowski and Professor Sabasin, we meet again."
"Your progress is amazing. More than a year ago, you were a doctoral candidate at Princeton, and now I should call you Professor Shen." Russian mathematician Kabrovsky, who received this year's Olympic Games together with Shen Qi Strovsky Medal.
Kabrowski's award is based on his contributions to the field of numerical analysis, and he is also an expert in number theory.
In the first half of last year, an 11-member jury led by Kabrowski went to the United States, and the review passed Shen Qi's proof of Riemann's conjecture.
Since then, Shen Qi has soared into the sky. Six of the nine mathematics awards he won came from more than a year after the Riemann conjecture proof was recognized by the jury, including the highest honor Fields prize.
Shen Qi was grateful to Kabrovsky: "Professor Kabrovsky, if I have the opportunity, I will definitely visit Moscow."
Professor Kaburovski welcomed: "You are so young, you should come to Moscow to have fun. Moscow is a paradise for young men."
"I can testify to this. I have been to Moscow three times, and every time I linger. In contrast, Manchester is boring." Indian mathematician Sabasin smiled that men can understand. He is a professor at the University of Manchester. Came from the UK to participate in this academic exchange.
At the Riemann Hypothesis review meeting more than a year ago, Sabasin first made things difficult for Shen Qi, and then became a fan of Shen Qi. His evaluation of Shen Qi was: a person with a genius brain and devil logic.
"So Professor Shen, it took you more than half a year to prove Goldbach's conjecture, which is really remarkable." Sabasin saw Shen Qi's paper on the proof of Goldbach's conjecture on arVix, and in fact, the whole world saw this public Paper from a week ago.
"It was conceived for half a year, and the draft was completed within a week." Shen Qi said.
"Devil." Sabasin spit out a word in a daze.
"The reminiscence time is over, let's ask Mr. Devil to tell us about his proof ideas."
Kabrowski and other mathematicians sat down to listen to Shen Qi's report on the Gechai proof.
"I believe everyone has read my paper published on arVix. Eight lemmas are the framework, eight definitions are the premise, one equation is the core, and four conjectures are the results." Shen Qi quickly entered the speech state.
"Here, I only focus on the proof process of Goldbach's conjecture, and the proofs of the other three conjectures refer to Goldbach's conjecture."
"I will briefly talk about Lemma 8 among the eight lemmas. The first seven lemmas are all recognized correct propositions, and Lemma 8 is proved by myself."
"Please look at the screen. According to Lemma 7, through the method of contradiction, it is intuitively proved that if a is an algebraic number and θ is a transcendental number, then the product aθ of a and θ must be a transcendental number. This is Lemma 8."
"I'll focus on eight definitions and one core equation next."
"Definition 1: f(x) = ρx + b, let ρ∈Q, b∈z."
“定义2:g(x)=1+Γ(x)/x+1+1+Γ(2n-x)/2n-x,令n∈Z+。”
"Definition 3: Let h(x) = cosβ(x) + sinβ(x) = cosg(x)π + isinf(x)π."
"Please note that the first three definitions are very important. If you remember the twin matching method in Riemann's conjecture and the second expression of ζ(s), then these first three definitions can support the core equation."
“请看核心函数构造方程:cos(1+Γ(x)/x+1+Γ(2n-x)/2n-x)π+isin(ρx+b)π=-1
. "
Shen Qi said this in one breath, he was thirsty, he paused to drink some water, and left some time for the mathematicians present to understand his thinking.
"Obviously, finding the solution of this function construction equation is equivalent to proving the 1+1 problem of Goldbach's conjecture." Professor Sabasin said, in fact, he has read Shen Qi's paper, and knows that Shen Qi has solved the equation solution.
Everyone just wants to hear from Shen Qi himself, yes, that's right, the solution of this equation is...
"Yes, that's right." Shen Qi felt refreshed after drinking the mineral water and wanted to drink another bottle.
"People will definitely ask, three definitions seem to be enough, why should I define eight?"
Shen Qi switched to the five definitions on the next page and said: "Europe is the center of world football. Everyone must like to watch football matches. At the most critical moment, it is not safe for Cristiano Ronaldo to score three goals. He Eight goals have to be scored for Portugal to have any hope of beating Spain."
Ha ha.
The mathematicians laughed and got it.
Academic exchanges will be conducted in a relaxed and harmonious atmosphere.
When Shen Qi was a doctoral student, even as a doctoral student at Princeton, some people made things difficult for him, trying to keep him from stepping down.
Shen Qi has won nine mathematics awards, one of which is the Fields Medal. All the mathematicians present here can do is to listen, put forward objective opinions and questions, communicate in a friendly manner, and live in harmony.
Status and respect need to be won by oneself, Shen Qi calmly answered the questions of mathematicians, and there were many reporters waiting outside the meeting room.
(End of this chapter)
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