News reports about Shen Qi were released soon.

"Chinese mathematician Shen Qi added another award, and the Ramanujin Award is the sixth math award that Shen Qi won in two years!" - News reports from China Radio International Chinese Channel and English Channel.

"The Chinese key opened the door in Italy. After you get the Ramanujin Award, will the Fields Medal be far away?" - Report from the American CNN.

"The youngest Ramanujin winner, Shen Qi, the key to China, set a new record held by Peter Schultz." - Report from the Italian media Ansa.

Pete Schultz was only 26 years old when he won the Ramanujin Award, setting a new record for the youngest winner at that time.

Just now, the younger Shen Qi broke Schultz's record.

System: "New Achievement! The host won the A-level mathematics award, Ramanujin, and became the youngest winner in history. The basic reward is 1 million points for the top student points, multiplied by the top student talent coefficient of 2.0, and the final reward is 2 million points for the top student points. The balance is 9377,510 points for the top student points, please confirm it by the host."

Shen Qi finally won a Class A Mathematics Award, and was promoted to Class 14 of Mathematics Condition 2, with a progress of 1/5.

The progress of condition one is close to 1/2, while the progress of condition three is still 0%.

The next day, in the ICTP report hall, Shen Qi published a theme report on "The latest research progress of rt third expression".

Winning the sixth math award and being the A-level Ramanujin Award, Shen Qi, who was proud of himself, performed freely on the podium: "My team and I took the real part of the zero-point expansion of -ζ’/ζ(s), and we got this equation."

The formula on the large screen is:-

reζ’/ζ(s)=σ-1/is-1i^2-∑pσ-β/is-pi^2+o(1/λ(s)+log(isi+2))

The audience was focused and could listen to the needle in peace.

Shen Qi said calmly: "Let's review the definition of Shen's twin matching method. Suppose the set of non-obvious zero points of the Riemann ζ function is: {p1,1-p1,p2,1-p2,...,pk,1-pk,...pn,1-pn}. The set formula shows that: Any two non-obvious zero points with the characteristic of "sum value is 1 and the absolute value of the imaginary part is the same" matched as a pair."

"... Combining this equation, where ∑p represents summing any number of non-obvious zero points, I only take one p=p0 in ∑p, so there is a normal number 1, so that ζ(s) has no zero points in the region σ≥1-1log^-1(iti+2)."

"In other words, we got the best non-zero area so far!" Shen Qi turned from slow to slow, and the rhythm of his speech changed to a powerful and powerful way.

Wow!

The report hall instantly burst into thunderous applause from silence.

Shen Qi said with a burning and firm look: "In the report just now, I listed four ways to verify the third expression. Although it is only framework. Although we have not yet obtained the third expression of ζ(s), we are not far from success!"

"It is not difficult to predict that once the third expression is verified, the value of Riemann's theorem will increase in geometric multiples!"

"I know, I have a nickname called China Key, and in my opinion, the third expression is this precious key, and I am just a guardian, responsible for managing the keys. Thank you for listening, my report is over!" Shen Qi bowed and thanked and ended the report.

All the audience stood up, ictp, imu, mathematicians from all over the world, applauded and cheered from the bottom of their hearts, and the Chinese Key opened the door in their hearts with a wonderful speech.

Shen Qi's conference report, "The Latest Research Progress of the Third Expression", was widely studied overnight.

German science and education media exclaimed: "China's key has taken action! Shen Qi launched an offensive in Europe!"

More than a week ago, Schultz received the Keith Medal in Edinburgh and published the latest report, a report on the Hodge's conjecture. For a time, Schultz was at its peak, and he was already very popular, so purple that he turned black.

At this time, Shen Qi crossed the Atlantic Ocean to Europe, and used his strength to announce to the European mathematics and international mathematics that the battle had just begun and the good show was coming.

After the report meeting, Shen Qi had a long and erect talk with Andrew Wiles.

"Great speech." Wiles first affirmed it, and then said: "But I still have doubts. Oops, you got the best non-zero area so far, which is of great significance. However, based on this result, you have not achieved the final result, what I want to see."

Ginger is so spicy that Wiles can see through the essence at a glance when looking at the problem.

Shen Qi knew that Wiles would say this, and he smiled and said, "Professor Wiles, the results you want to see are also the results I want to see, and it is still in fertility."

"Yes, follow your logic and get the best non-zero area of ​​ζ(s), you set four ways to verify the third expression of rt. I understand that these four ways are four mathematical tools. In your report yesterday, you did not explain in detail how to use the four tools, but just put forward conceptual framework content."

"The first three ways are still a name and basic definition for the function logζ(s), the basic theorem of prime numbers, and the zero point equation. The fourth way, you named the 'Fourth way', has no definition. So are you in trouble?" asked Wiles.

Shen Qi stopped laughing and did encounter a little trouble.

"In the face of pure number theory, I am actually an amateur. But my intuition of a number theory outsider tells me that you are in trouble," said Wiles.

"No, you are not an outsider, you are a genius." Shen Qi has studied Wiles' proof of Fermat's theorem many times. Wiles used algebraic geometry methods to prove the Fermat's theorem for the number theory problem. How could such a person be an outsider?

"Yes, you know, I spent a whole decade studying the Fermat's Theorem in Princeton. In those ten years, I only did one thing - prove the Fermat's Theorem, the damn Fermat's Theorem."

"When I finished writing the 200-page paper, I was 41 years old." Wiles recalled the past. He was the only winner in the history of the Fields Medal who was over 40. He won the Fields Special Award for his successful proving the Fermat Theorem, at the age of 45.

"The most fatal thing is that "Mathematical Invention" denied my 200-page paper. At that time, I was desperate, and this hit me very hard. I paid everything within ten years, but only got a bunch of useless garbage. At that time, I even thought of committing suicide." Wiles, who was nearly 70 years old, said this in an extremely calm tone.

And the listener Shen Qi's nose felt sore as he listened.

Wiles patted Shen Qi on the shoulder and said, "Qi, the trouble I encountered at that time was greater than the trouble you are now."

"Professor Wiles, we all know what happened later. You successfully proved the Fermat's theorem and won the Fields Medal. How did you solve that big problem?" Shen Qi asked curiously.

Wiles looked up at the sky: "I remember that night, I was drunk as drunk as I burned page by page. I wrote a paper for ten years and a paper for 200 pages."

"When I reached page 188, I suddenly woke up, and I had never been so awake in my life."

"Then within 20 minutes, I derived the core logic that proves Fermat's Grand Theorem."

"The new paper has only 130 pages, and this time it went smoothly and was recognized by the whole world." Wiles looked at Shen Qi and taught valuable experience.

Shen Qi: "..."
Chapter completed!