I really just want to be a scholar

Jiang Quansheng's Riemann Hypothesis report meeting has not yet started, it has attracted great attention.

In the hall, the guests and scholars who saw the agenda on the big screen all whispered to each other:
"This Professor Jiang really cracked the Riemann Hypothesis?"

"Deciphering the Riemann Hypothesis by constructing expressions is indeed a new direction in the past year or so. It is said that this was first proposed by Qin Ke who gave a report yesterday."

"But this Professor Jiang doesn't seem to have published any papers on Riemann's conjecture. He doesn't seem to be very good at number theory."

"Who knows, maybe they have been doing research secretly all this time, planning to make a big splash?"

"I don't believe it. It's impossible for such an important subject to go unnoticed, right? It's even more impossible for him to complete it by himself, right?"

"I don't know about that. I'll know later? At such an important academic report meeting, I don't believe he will talk nonsense."

"If Professor Jiang really cracks the Riemann Hypothesis, it will probably be the greatest academic achievement in this year's Breakthrough Prize report meeting, or even in the international mathematics community this year!"

"Anyway, let's wait and see."

Noticing that more and more people were pouring into the lecture hall, Qin Ke quickly dragged Ning Qingyun in and found two seats to sit down.

Ning Qingyun asked in a low voice: "Qin Xiaoke, what do you think? Four expressions can prove the Riemann conjecture?"

She did not participate in Qin Ke's research on Riemann's conjecture, but she also knows that Riemann's conjecture requires at least five to six sets of expressions to be completely deciphered. Academician Heng discussed the Riemann conjecture. With her excellent memory, she still has some impressions.

"It's hard to say, after all, there is no shortage of geniuses in mathematics." Qin Ke touched his chin: "But I can only say 'hehe' if I claim to have solved the Riemann conjecture with four expressions. I was in a hurry to do such a frivolous move of the headline party."

Qin Ke is really curious. Although he has not focused on the Riemann conjecture for more than a year, he has been paying attention to the papers in the four top journals. Naturally, he knows that there has not been any one about the Riemann conjecture. published papers.

In his impression, in the past year or so, the only one who has achieved real results in the Riemann conjecture is the old academician Wang Heng of Taishan Beidou in the number theory circle of Xiaguo.After all, this is a great master of number theory who, relying on his own knowledge of number theory, followed his train of thought abruptly, Riemann's conjecture deduced the second set of five expressions.

Could this Jiang Quansheng's level be able to catch up with Academician Wang Lao?
Qin Ke expressed doubts.

……

Jiang Quansheng's report will be the first one today.

Before the nine o'clock report time, the lecture hall of Nuo University was full.

After all, the reputation of Riemann's conjecture is too great. As long as you are engaged in mathematical research, no matter which subdivision you specialize in, you must hear the name of Riemann's conjecture.

Now someone claims to have conquered the Riemann Hypothesis, and still publishes the research results at such a serious and important academic report meeting, how can it not attract everyone's attention?
Originally, many people had lost interest in today's several mathematics reports, but they all poured into the lecture hall because of this topic.

This time, Jiang Quansheng can be said to have become famous before the battle.

Soon, the time came to exactly 9 o'clock. After the host read out, Jiang Quansheng strode onto the podium in a brand-new suit and leather shoes, with half-bald hair combed shiny.

The hot scene in the auditorium and the countless excited gazes made Jiang Quansheng quite useful, and he even felt a little ecstatic.

He clicked on the PPT interface, and the title of "Deciphering the Riemann Hypothesis with Four Expressions" was particularly conspicuous, as if it also made his originally somewhat short figure taller.

Jiang Quansheng straightened his chest, and said loudly with a red face: "Expert judges, fellow colleagues, I believe everyone must be familiar with the Riemann conjecture. In the past 150 years, countless ancestors have devoted themselves to the Riemann conjecture. Many achievements have been made in the research. For example, Qin Ke, a mathematician in the Xia Kingdom, once proposed a new direction to solve the Riemann conjecture by constructing core expressions, showing amazing talent. I was inspired by Inspired by him, I have devoted myself to studying Riemann's conjecture for more than a year, and finally achieved some results! Now, I will show my research results to you!"

The audience was silent, and Jiang Quansheng's high voice made everyone hold their breath unconsciously, waiting for the great historical moment that might come.

Many people who were skeptical saw Jiang Quansheng's high-spirited appearance, and their hearts were stunned. Could it be that the Riemann Hypothesis, one of the seven major problems of the millennium, is really going to come to an end today?

Under the gaze of countless people, Jiang Quansheng wrote down the first expression.

"ξ(s)=(exPs|U )^(1) exPs(sXq)"

Almost everyone present widened their eyes, this... what is this?
"This is the first expression that I have studied to crack the Riemann Hypothesis! Next, I will write the whole process of deriving this expression..."

At this moment, Jiang Quansheng almost forgot that the research results in his hand were bought from the dark net, and only an inexplicable sense of accomplishment ran through his body.

This is his stage, his show time!

After today, he will become the world's top scholar in the research of Riemann's conjecture!
Jiang Quansheng wrote out the entire derivation process that he had already memorized by heart line by line, as if he had been beaten with chicken blood.

"Through the derivation process of the first expression, we can see that when the set s is a non-trivial zero point in the trend interval [0, 2^(q+1)], the Riemann ξ(s) function is established, That is to say, the Riemann Hypothesis can be confirmed under this condition! It can be expressed in the form of the first expression!"

"But the meaning of Riemann's conjecture is far more than that. There should be several other conditions for its establishment! For example, the second expression ξ(s)=σs(s)*exPs(t/t (exPs| V ) The prerequisite for ^(1 )exPs(sXq)) is that the set s is the trend interval [0, 2^(q+3)]! Next, I will explain it in conjunction with the derivation process.”

The audience in the audience couldn't sit still anymore, Jiang Quansheng's performance was far beyond everyone's imagination, he could be called super god!

"It's interesting, these two derivations are no problem."

"That's right, a very rigorous derivation."

"Zhongzheng is peaceful, flat and progressive, excellent derivation, no flaws! Riemann's conjecture can indeed be transformed into the form of these two expressions under the set conditions!"

"Remarkable academic achievements. I never expected that Professor Jiang, who is usually silent in the direction of number theory, has such a profound background!"

"Seeing it makes my blood boil, and I feel that he can succeed!"

Jiang Quansheng listened to the vague discussions in the audience, the vanity in his heart almost exploded, and a kind of morbid pleasure flowed through his body. He wrote more and more vigorously, and the next two expressions and their derivation process I wrote it all out.

"The third expression: ln ξ(s)= ln ξ(0)+Σρln(1-s/ρ)+bs∏∞n, the derivation process is as follows:..."

"The fourth expression: ξ(s)=d(p, exPs(sXq))+ L(γs)+R(γ, X)dt+infS(D, f), the derivation process is as follows:..."

Looking at the more and more detailed derivation process, the discussion in the audience has become less and less, and many people are excited and ready to applaud.

A very perfect derivation, very convincing, and the Riemann Hypothesis, which has confused countless people, reveals its true side to the world in this representative form.

The expressions of the only two people in the auditorium were very strange.

Ning Qingyun tugged at Qin Ke's sleeve, and said in a low voice: "Qin Xiaoke, why do I think Professor Jiang's derivation method...is very similar to the style of Academician Wang? Is he also a disciple of Academician Wang?"

To say who really inherited the mathematical way of thinking of the old academician Wang Heng, it is not Qin Ke, but Ning Qingyun.

Qin Ke is used to taking a slanted sword, pointing directly at the core, and cutting through the mess quickly. Even if he learned the advantages of Academician Wang's mathematical thinking mode and added a kind of grandeur of "gradually progressive, flat push past", this did not change. A habitual style of thinking.

On the other hand, Ning Qingyun's mathematical thinking is more gentle and water-like, with the toughness of water droplets penetrating, and the perseverance of gradually permeating. He often uses different mathematical methods to "smooth" difficulties. The style of "playing steadily, pushing forward, and gradually deepening" is quite suitable.

So Ning Qingjun couldn't put it down after getting Academician Wang's handwritten manuscript. Even though Qin Ke had taught her the core essence of the handwritten manuscript through "Thinking Resonance", she still studied and studied repeatedly by herself, in order to learn from Academician Wang Lao's handwriting. The mathematical way of thinking is thoroughly understood and turned into self-use.

It is this careful thinking and patience that makes Ning Qingjun the only person in the world who can simultaneously integrate Academician Wang's "Wang School" and Professor Tian Jianlan's "Chen School" of mathematical thinking and mathematical methods.

This is also the fundamental reason why she played a huge auxiliary role in the final formation of the "Lime Number Theory Hypergeometric Mapping Method" and the proof of the Polignac conjecture.

At this moment, seeing the familiar mathematical way of thinking presented in the derivation process on the big screen, how could Ning Qingyun not feel puzzled?
A person's mathematical way of thinking will form a unique mathematical style, even if he has inherited the teacher's mantle, there will be certain differences.But the derivation style in front of him is clearly based on the mathematical way of thinking of the old academician Wang Heng!
Qin Ke shook his head: "I don't know, I'll check the situation of Jiang Quansheng online first."

His face was serious and his brows were furrowed.

Academician Wang Lao discussed the Riemann conjecture with him at noon on the day of the Shiing-shen Mathematics Awards report meeting, and showed him a small note with the second set of five expressions of the Riemann conjecture.

Ning Qingyun couldn't remember these expressions, but Qin Ke remembered them clearly, because except for a slight difference between the fifth expression and the S-level knowledge "Riemann's Conjecture Complete Analysis", they are almost exactly the same. Ke was so deeply impressed, how could he forget?

The four expressions written by Jiang Quansheng in front of him are clearly the last four of Academician Wang's five expressions!Even the "imperfect" in the last expression is exactly the same!
Is this a coincidence of academic achievements?
Qin Ke couldn't believe it.