The report will last from 8:30 am to 11:30 noon, just three hours is enough for Pang Xuelin to deconstruct and reorganize the essence of Ponzi's geometric theory, and present it to many mathematicians present at the meeting.

At the last Paris lecture, Pang Xuelin only showed the outside world the blackboard writing of Ponzi's theoretical framework of geometry, and there are not many mathematicians who can keep up with his rhythm.

Even though more than half a month has passed, there are still a handful of mathematicians in the mathematics world who can really understand the blackboard writing thoroughly.

Therefore, today's report meeting is more like a lecture than a report.

As Pang Xuelin gradually deconstructed Ponzi's geometric theory, the faces of many mathematicians present showed sudden enlightenment expressions.

"So that's it! Professor Pang actually used P-adic numbers to combine the addition structure and the multiplication structure to explore the internal structure of prime numbers..."

"After Far Abelian Geometry was restructured by Professor Pang, it feels like a new world has opened..."

"Wonderful! It turns out that the key to cracking the abc conjecture is actually here..."

...

In the audience, from time to time, there were joyful discussions.

That is the joy that emerges from the bottom of my heart when I witness the truth.

For Schultz, Mochizuki Shinichi, Perelman, and Stix, who have already had a thorough understanding of the theoretical framework of Far Abelian geometry, Pang Xuelin's report also gave them a lot of new ideas. Inspired, let them have a new understanding of this new subject of mathematics.

"Professor Pang is really a genius. It's hard to imagine that he has constructed such a huge and profound theoretical framework at such an age, and the maturity of this theory has far exceeded my expectations. If I were to do it myself If so, even if the idea is correct, it may take decades to perfect this theory to this point. I really don’t know how Professor Pang did it. You must know that he just proved the BSD conjecture a few months ago Woolen cloth."

Mochizuki looked at Pang Xuelin's young face on the stage and muttered to himself.

Perelman said: "There are many such people in history, such as Gauss, Abel, Galois, and even Grothendieck... It's just that the theoretical framework of modern mathematics buildings is increasing and strengthening, and young scholars only use the foundations of various fields of mathematics. It will take more than ten years to complete the course, let alone create a new theoretical system. Geniuses like Pang are indeed becoming less and less!"

Mochizuki nodded and said: "Grigory,

Have you read Professor Pang's paper on the analytical solution of nonlinear partial differential equations? "

After the group of them arrived in Jiangcheng yesterday, they didn't communicate too much. As soon as they arrived at the hotel, they went back to their rooms to study Pang Xuelin's new paper "A Method for Analytical Solutions of Nonlinear Partial Differential Equations with Broad Significance" .

That paper was more than one hundred pages long and involved many concepts.

Mochizuki did not do much research on partial differential equations, and it was very difficult to read. Last night until four o'clock in the morning, he only read more than fifty pages.

Perelman said: "I have roughly finished browsing. I can't guarantee that there are no loopholes in the details of this paper, but in terms of overall thinking, I don't think there is a big problem!"

Mochizuki couldn't help showing shock in his eyes, and said: "This method of finding the analytical solution of nonlinear partial differential equations is really what Professor Pang said, the title of Grothendieck in the 21st century, he should be It deserves its name!"

The two were talking in a low voice. At this time, the speech on the stage came to an end.

"Okay, let's stop here with the relevant theories of Ponzi geometry. Let's go to lunch first, and then take a rest at the hotel. At two o'clock in the afternoon, I will continue to answer your questions in the auditorium."

The audience was quiet for a while, and gradually became noisy.

clatter——

I don't know where the applause started, but gradually, the applause swept the entire hall of the auditorium.

After getting up, many people took off their hats to pay tribute to Pang Xuelin, and some people bowed to Pang Xuelin, as if performing a disciple's ceremony.

Perelman and Mochizuki were together. They originally wanted to go up to say hello to Pang Xuelin, but they didn't expect many scholars to surround Pang Xuelin as soon as he stepped off the stage.

Neither Perelman nor Mochizuki Shinichi was the kind of troublesome person. Seeing that Pang Xuelin couldn't get away for a while, they prepared to leave the auditorium with the flow of people and go to the hotel for dinner first.

But just after taking two steps, a voice came from behind.

"Mr. Perelman, Mr. Mochizuki, wait a minute!"

When the two turned their heads, they saw Pang Xuelin get out of the crowd at some point and walked towards where they were.

"Professor Pang, hello!"

Mochizuki Shinichi smiled.

Perelman was not good at words, but at this time, he also showed a kind smile on his face, and nodded towards Pang Xuelin.

Pang Xuelin stepped forward, shook hands with the two of them respectively, and said with a smile: "Professor Mochizuki, Mr. Perelman, hello! I knew you were coming yesterday, and I originally wanted to go to the hotel to meet you, but I was busy a while ago. Writing the thesis was not completed until yesterday morning. I was too tired yesterday and slept at home all day, and I was lucky enough to meet you two today."

Perelman said: "It should be our honor, Professor Pang, your speech was very good this morning, and it inspired me a lot."

Pang Xuelin smiled and said, "I'm just sharing my understanding of Ponzi geometry with everyone. Let's have dinner first and talk while walking. How about it?"

"good!"

Mochizuki Shinichi and Perelman will naturally have no problems.

Mochizuki said: "Professor Pang, the paper you published yesterday on the general solution of analytical solutions to nonlinear partial differential equations is really shocking. I haven't seen you mention this research before. How did you think of Pang? geometry and the problem of solving nonlinear partial differential equations?"

Pang Xuelin was prepared for this kind of question. He said: "Actually, the research on Ponzi geometry was originally thought of by me to solve the problem of solving partial differential equations. When I was studying for a master's degree at UCLA, I once Helping a material science research team build a mathematical model, it turns out that the mathematical model is a partial differential equation system, which is very complicated to calculate, and the accuracy of the solution is not high."

"Later, I wondered whether I could find a general method to solve nonlinear partial differential equations. When I was a Ph.D. student, I began to establish the relevant theory of Ponzi geometry based on Far Abelian geometry. The result was a A month ago in Paris, Professor Schultz accidentally gave me an inspiration, making me realize that Ponzi geometry can also solve the problem of ABC conjecture. So I spent one night, using Ponzi geometry to prove the ABC conjecture. It’s just Paris There was not enough time for that report, so I didn't bring up the theory of general analytical solutions of nonlinear partial differential equations..."

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