A proof usually defines prerequisites. If the prerequisites are defined incorrectly, then all subsequent work is meaningless.

Shen Qi looked in the voice and said that the question was Professor Yan.

Professor Yan is the one who is there? His famous brand says "Professor Yan Gang of Huda University".

Shen Qi does not know Professor Yan.

The Chinese mathematics circle is not big, and the number theory circle is even smaller, but not every expert and scholar can recognize it.

Based on the principle of friendly exchanges, Shen Qi asked in an inquiring tone: "Professor Yan, I would like to hear the details."

Professor Yan smiled faintly and began to explain his reasons: "In your report, Shen Qi, the number of points on the curve determined by Equation 2 is determined by the number of key factors of k, please return to the previous page."

Shen Qi turned to the previous page ppt and waited for Professor Yan's next explanation.

"I have done 8 years of research on this Diopantu equation. The general view is that if m is equal to 0.1, it can be obtained from William and Jongelen's classic theory that the equation only has a positive integer solution (x,y)=(1,1), which is a certain difference from the prerequisites you set by Shen Qi." Professor Yan spoke slowly, and he wore gold-rimmed glasses, giving people a gentle and elegant impression.

"This..." Zhou Yuan, who attended the meeting at this venue, showed a puzzled expression. He couldn't remember what the classic theory of Qiong Glenn was talking about.

Ordinary people sometimes find it strange, why can mathematicians remember so many mathematical formulas, theorems, assumptions, and inferences?

Will mathematicians remember it wrong? Will Jon Glenn's theorem be incorrectly remembered from Jack Jones's theorem?

Of course, mathematicians can make mistakes and remember them incorrectly. It’s just that their memory is stronger than ordinary people, and they are studying mathematics every day, so the probability of making mistakes is lower.

Even mathematicians with strong memory cannot remember all mathematical formulas, theorems, assumptions, and inferences. Therefore, mathematicians usually choose one or two main attack directions, no more than five, and specialize in several.

William Jongelen is a Norwegian mathematician and is not very famous. The Jongelen theorem he left behind is an unpopular theorem in the branch of the Diopian equations in the field of number theory.

If you didn’t deal with number theory every day and devote yourself to studying the Difantu series equations, even a top student in the mathematics department of Yan University may not be able to remember the specific properties of Qionggelen’s theorem. For example, Zhou Yu'an.

It is very embarrassing to use a math book to search for formula theorems when participating in the seminar.

Zhou Yuan studied the basics of number theory and studied for a semester. All the students in the mathematics department had to learn this course.

It is normal for Zhou Yuan, who has chosen differential geometry as depth, to remember the unpopular number theory theorem.

Ou Ye is very familiar with logarithmic theory. She remembers Qionggelen's theorem, but she is in poor health and rests in the hotel and does not come to the exchange meeting.

Zhou Yuan was the audience and was not qualified to speak. Sun Erxiong, who brought him into the venue, was qualified to speak.

After all, Sun Erxiong has been struggling in the mathematics world for so many years, and he can understand Professor Yan's point of view.

"Is this professor named Yan trying to make Shen Qi unable to get out of the stage?" Sun Erxiong frowned, thinking about countermeasures, and trying to help Shen Qi save the situation.

However, Sun Erxiong was worried too much.

After thinking a little, Shen Qi answered calmly and calmly: "First of all, I fully agree with Professor Yan's point of view. Qionggelen's theorem is applicable here. In fact, in my first edition of the paper, I used Qionggelen's theorem."

"After thinking about it, I wrote the articles of the Seventh Manuscript, combined with the opinions and suggestions of Yanda number theory experts and Princeton-related researchers, I finally made up my mind to redefine the Tue equation in the ninth edition of the paper."

"In this definition, if a certain k> is equal to 0 and u2k+1 is a square number, then u1 is also a square number. This is not contradictory to Professor Yan's point of view, and thanks to Professor Yan's insightful views." Shen Qi's calm statement was neither arrogant nor impatient, insisted on his own point of view, and at the same time did not deny Professor Yan's view.

At this time, a young and middle-aged expert expressed his opinion: "Shen Qi redefines the Tue equation as a prerequisite, and there is no problem with this. I have seen the original text of the Wash conjecture proof published by Shen Qi on Jams. The preparation of redefining the Tue equation seems complicated, but from a global perspective, sharpening the knife does not delay cutting wood. All solutions can be given by (u2k+1, v2k+1), which instead improves the accuracy of the whole text and reduces unnecessary repeated arguments."

Shen Qi looked at the middle-aged and young expert, who looked 34 or 35 years old, had thick hair, thick eyebrows, big eyes, national face, and his famous brand "Professor Su Yiwen of Hua University of Science and Technology".

Well, Professor Su is a sensible person, so I like him. Shen Qi doesn’t know Professor Su, but Professor Su brought Shen Qi very good first impression. He is a fellow student and worth getting to know him.

Sun Erxiong looked at Professor Su and smiled, Xiao Su, should you go back to Yanda?

Professor Su had an eye contact with Sun Erxiong that was not easy to detect. Lao Sun, you are still so fat. It seems that Yan Da is well treated.

As the listener, Zhou Yuan did not understand the arguments of Shen Qi, Professor Yan and Professor Su, but he keenly realized that there must be a historical connection between Sun Erxiong and Professor Su of Hua University of Science and Technology.

Zhou Yuan's observation ability is keen and accurate. Professor Su studied at Yan University's Mathematics Institute from undergraduate to doctoral degree, and currently teaches at Hua University of Science and Technology.

Professor Su, who has a background in Yan University, has a reasonable and well-founded support for Shen Qi. The work he is doing is similar to annotating Shen Qi's works.

The experts and scholars at the meeting had no objection to this issue. Shen Qi's explanation + Professor Su's annotation was very perfect and had no flaws. Shen Qi's redefined Tue equation is a necessary prerequisite for proving the Wash conjecture and is irreplaceable.

Professor Yan said politely and politely: "I keep my reservations and please Shen Qi continue to give a report."

Shen Qi smiled slightly and entered the subsequent reporting stage.

The debate between intellectuals is not about shrews scolding the streets, and agreeing with or denying other people's views. It must have sufficient arguments and clear logic.

Shen Qi's proof of Wash's conjecture has been published in four major mathematics journals. He just won the Chen Shengshen Mathematics Award and was in the limelight.

In the face of doubts, Shen Qi could say, "You can do it, you can do it. You have spent 8 years doing research before, but why didn't you successfully prove the Wosh conjecture?

But Shen Qi cannot say that. He is a senior elite and is about to be promoted to a master of mathematics. He must have the demeanor of a master.

What is the master's demeanor?

Conquer you gracefully and calmly.

Shen Qi continued to give a report elegantly and calmly. He was a figure who passed the test of Princeton Mathematics tycoon. The number theory textbooks for undergraduate students in Princeton Mathematics Department were revised due to a proof from Shen Qi.

Shen Qi didn't say this, it would be boring if he said it himself.

Wait for Princeton's new version of the number theory textbook to be published, and everyone can study it yourself.

"I used the effective approximation of algebraic numbers here. Everyone is an expert. I won't go into details about the lemma proof, just talk about the key points." Shen Qi explained the second half of the report, and most of the experts at the meeting nodded frequently and praised it.
Chapter completed!