I Just Want to Be a Quiet Top Student

Shen Qi wrote his views on the blackboard:

Res(g(s)-2k)=Τ(s)ζ(s)(2α)^-s...

"When k is greater than or equal to 1, s=0 is the first-order pole of g(s). In the integral of this formula, I transform τ to be -2k-s..." Shen Qi stated loudly, and tapped a sign on the blackboard. Formula: "Then get this formula, then the sum-path transformation can be transformed into the sum in the twin matching method. Based on this setting, the first expression of ζ(s) I obtained is established. That is Said, I am not using any theory in the Hardy system, the Hardy system is a classic system, but the 21st century needs a new, more advanced system, thank you."

Shen Qi's impassioned statement was well-founded and won the approval of most of the experts present.

"There are contradictions between Euclidean geometry and Lobachevsky geometry, but both systems are being used, there is no absolute right or wrong." Kabrovsky said, in the first question In the end, he supported Shen Qi.

"We have studied Newton's classical mechanics system and quantum mechanics system. Newton was not wrong, and Einstein and Schrödinger were also right." Rodriguez added.

"Shen is an excellent scholar, but no one can compare with Einstein, Schrödinger, and Lobachevsky." Maynard seemed a little excited.

"Don't be so excited, Professor Maynard, I think what Professor Kabrowski and Professor Rodriguez said makes sense. Shen's twin matching method is not contrary to Hardy's system. Day and night will not exist at the same time. But they all have meaning.” Carrick, a neutral Canadian mathematician, gradually leaned towards Shen Qi, he believed that Shen Qi’s answer to the first question was reasonable, there were no loopholes in logic, and Shen Qi’s new theory was tenable.

"Professor Kabrowski, Professor Rodriguez, and Professor Carrick, we have been discussing the first question in Sweden for two months. I still support Professor Maynard's point of view. Only the Hardy system is The only correct way to solve Riemann's conjecture." Australian mathematician Wilson stood up, and he stood on Maynard's side with a clear attitude.

"Hardy and Ramanujan failed to prove the Riemann conjecture. What is lacking is time, and we have plenty of time. We should follow the correct path of Hardy and Ramanujan." Curly-haired Indian mathematician Saba Xin, he was really with Maynard, Maynard supported the British master Hardy, and Sabathin did not forget to move out Hardy's best partner, Ramanujan, the pride of Indians.

Shen Qi watched the three mathematicians from the Commonwealth countries with cold eyes. It is normal, it is normal. No matter how reasonable I say, someone will always jump out and accuse me.

At this time, Kenji Nakamura, a mathematician from the University of Tokyo in Japan, stood up, walked to the blackboard, picked up chalk and wrote:

ρ1,1-ρ1

ρ2,1-ρ2

ρ3,1-ρ3

...

ρn, 1-ρn

...

ζ(s)=e^A+Bs∏∞n=1(1-s/ρn)(1-s/1-ρn)e^(s/ρn+s/1-ρn)

After finishing writing, Nakamura Kenji said: "I studied Shen's twin matching method very deeply. I used the vertical combination method to deduce the same conclusion as Shen's first expression. We should respect the facts and respect Mathematical laws, Shen's theory is correct, this is the most basic mathematical law without a doubt."

Shen Qi was very surprised, hehe, Nakamura, a Japanese, actually supported me, he used the Fundamental Theorem of Algebra to verify my twin matching method and the first expression, quite thoughtful, wonderful!

There is justice in the world, and mathematicians with real conscience and professionalism focus on mathematics itself, and all other factors are outside the scope of the review.

Starting from the fundamental theorem of algebra, Kenji Nakamura verified that Shen Qi's new theory was logically established.

"I still stick to my point of view, and I also obey the rules of the jury. Let's vote for the final decision." Maynard is particularly stubborn, like most British people.

The current situation is 4 for the support faction: 3 for the opposition faction: 4 for the neutral faction.

Shen Qixin said that in your voting session, if you approve my proof of Riemann's conjecture, do you need more than 50% or more than 80% of the votes?

It will not be a one-vote veto system!

The voting setting must be asked clearly, otherwise Maynard is determined to target me to death, and it will be a mess.

"6 votes, 11 of us cast more than 6 votes in favor, including 6 votes, then IMU and "Acta Mathematica" will approve your paper." Kabrowski, the head of the jury, explained to Shen Qi Read the voting rules.

"It's fair, isn't it." Shen Qi was determined, and asked, "So we don't have to worry about the Hardy system anymore?"

"Go to the next question. This question is a question I have always been concerned about." This time it was Kabrowski's turn to ask questions. He asked Shen Qi, how to explain that under the setting of the twin matching method, ρ must be the first-order zero point?

This question is well asked, professional without losing the standard, high-end and high-end.

Kabrowski's question was objective and fair. Starting from mathematics itself, Shen Qi thought it necessary to explain clearly to the jury.

Shen Qi refreshed himself to answer the second question, and it was already twelve o'clock at noon after answering the second question.

For four full hours in the morning, Shen Qi answered two questions in total.

The review experts are very professional, they pay attention to any doubtful details, and it cannot be done in 45 minutes.

If "Proof of the Riemann Hypothesis Based on 'Twin Matching Method'" is to pass the review, it means that more than six experts have no doubts about every detail, that is to say, Shen Qi must get more than six full marks .

One afternoon passed, and two new questions were perfectly answered by Shen Qi.

Burning the lights and fighting until the early hours of the morning, the jury asked a total of 8 questions today, exhausting Shen Qi like a dog.

Fortunately, the result was quite satisfactory. Shen Qi's intuition told him that the number of supporters had reached about six.

At dawn, the review continued. On the second review day, Shen Qi answered 5 questions.

After three days of continuous trial, Shen Qi carried it over, but the aged Captain Kabrovski collapsed from exhaustion.

On the fourth day, the head of Kabrowski went to work with an illness. He asked the last question of this review: "If the Riemann conjecture is true, then Shen, how do you explain logζ(σ+it)\u003c\u003c(log ∣t∣)^2-2σ+ε, where ∣t∣≥2, ε＞0, 1/2≤σ≤1.”

According to Shen Qi's observation, the current situation is support faction 6: opposition faction 3: neutral faction 2.

After answering the last question, the overall situation is settled!

This question is a new question derived from the discussion of the main text of the thesis. Shen Qi started to write on the blackboard with chalk. ∣≤3/2-σ has logζ\u003c\u003cσ^-1log∣t∣,∣t∣≥2, obviously, the \u003c\u003c constant here has nothing to do with σ! It has nothing to do!"

Shen Qi erupted, thunderous!

Startled, Maynard accidentally spills coffee on his trousers.

Except Maynard, Wilson, and Sabathin, three Commonwealth mathematicians who were sitting on chairs, the other eight mathematicians stood up with excited expressions.

"Shen, you actually came up with this proof method in such a short period of time!"

"Perfect proof that the Riemann Hypothesis is a correct proposition!"

"Let's vote, yes, there is nothing more to ask, Shen is a genius, let's vote for genius!"

Boom!

Shen Qi tapped on the blackboard: "Everyone please sit down first, I haven't finished talking yet."

The situation was excellent, and the eight mathematicians in the jury were completely conquered by Shen Qi.

There are now 8 upvotes!

Shen Qi has almost become a god, the rest is only a matter of time.

Appreciation, applause, frustration, helplessness, and dissatisfaction, all kinds of emotions are mixed together in the conference room.

Under the attention of everyone, Shen Qi had a sudden inspiration to write down a new formula, and he tapped on the blackboard excitedly: "If the Riemann conjecture is true, there is another situation that when 1/2+(loglog∣t∣) When ^-1≤σ≤1, there is logζ(s)\u003c\u003c(loglog∣t∣)(log∣t∣)^2-2σ, where \u003c\u003cconstants are absolute constants! Absolute constants! Perfect, it’s perfect !"

brush!

The Indian mathematician Sabasin couldn't help jumping up, his eyes were wide open, and his curly hair was straightened: "Yes, he is right, genius-like imagination, devil-like derivation logic..."

Seeing Sabasin's bewitched appearance, Maynard was furious, the Indian guy is too unreliable, Shen Qi instigated him the fuck?

Maynard looked at the blackboard. As a top number theory expert, he had to admit that Shen Qi did have a brain like a genius and a logic like a devil...

...