For example, Tao Xuanzhi first assumed that the modal space M is compact, but its local structure may allow multiple modal paths Γi to overlap or intersect. That is:

Then by restricting specific constraints, f can be made globally unique. However, Qiao Yu feels that Tao Xuanzhi's method is still too complicated, and there is an additional process from local to global...

After a while, Peter Schultz and Pierre Delini also nodded and approved Qiao Yu's proof.

Finally, James Maynard also took off his glasses, turned on the microphone and said: "Okay, I have no problem anymore. Congratulations, Qiao Yu, you proved the Riemann Hypothesis!"

Lot Dugan, who had been listening in, laughed, and then turned on the microphone: "Well, it seems that all the reviewers have no objections, so I will add this proof process to the paper.

Thank you to all the reviewers for your support. Annals of Mathematics plans to publish a special issue on Qiao Yu’s paper! We also thank Qiao Yu for supporting us! Everyone has worked hard.”

To be honest, Lot Dugan was very excited at this time.

The paper that proved the Riemann Hypothesis was finally published in the "Annals of Mathematics".

"Wait...I still have some ideas about that." Just when everyone breathed a sigh of relief, Qiao Yu suddenly said.

Everyone's eyes were focused on Qiao Yu, although it was through the camera.

Especially Lot Dugan, he was even a little nervous.

"After these days of thinking, I have come up with three new conjectures, which I hope to add to the paper." Qiao Yu said with a wink.

"Tell me about it," Lot Dugan said immediately.

"The first one is the prime number gap symmetry conjecture. The specific description is that within an arbitrarily large range of prime numbers, the distribution of prime number intervals has some kind of symmetry.

That is to say, there is a natural number N and a symmetric function f(x). For all pairs of prime numbers pn, pn+1 satisfies:

After finishing speaking, before everyone could react, Qiao Yu continued: "The second one is the conjugate conjecture between the prime number and the modal zero point. There is a conjugate relationship ψ(zn) between the zero point zn on the modal path Γ and the prime number p.

=p, satisfies:

"The third is the high-dimensional prime projection conjecture. For any prime number p, there is a high-dimensional mapping Φ:N→R^k (k≥3), such that in a specific subspace, the distribution of prime numbers satisfies: ‖Φ(pn

+1)Φ(pn)‖=f(n), and f(n) is a recursive or periodic function.”

Mr. Yuan told him specifically, and Professor Zhang Shuwen also told him that time that mathematicians should not only be good at solving problems, but also be good at asking questions.

So in addition to discussing the paper with these reviewers these days, Qiao Yu also raised these three questions.

To put it bluntly, these three questions are still related to the distribution of prime numbers. This is also Qiao Yu's original intention to study prime numbers.

If all three conjectures can be proven, then we will definitely be able to master a method of quickly finding prime numbers through the tools that solve these three problems. No matter how big the prime number is, it is very practical.

Especially the first conjecture, if it can be solved, the twin prime conjecture will basically be solved.

Of course, these are also conjectures put forward around the generalized modal axiom system.

From this point of view, Qiao Yu can be regarded as satisfying the ideas of these mathematics masters to carry forward the generalized modal axiom system.

As for the paper passing review...

For Qiao Yu, this is a trivial matter. After all, he has always believed that his proof process was flawless! If he fails, someone must be coveting his results.

Fortunately, this did not happen! Of course, if you think about it carefully, it is unlikely to happen.

After all, the method he used was so novel that no one but him could prove it.

…

After a period of silence in the conference software, Lott Dugan spoke up: "Okay, Qiao Yu, you almost scared me just now. You can put these conjectures in the final summary of the paper. But as soon as possible, I have

Can’t wait to announce this news.”

Full of goodwill.

After all, Lot Dugan still wants to get Qiao Yu to come to Princeton as a professor. Although Qiao Yu's current academic qualifications are still in question.

Really, Lot Dugan felt that Tian Yanzhen and Yuan Zhengxin were too old-fashioned. He simply couldn't imagine that Qiao Yu was still an undergraduate.

Even at Princeton, which has always been known for its rigorous graduation, Qiao Yu can get a doctoral diploma with his current achievements, and no professor will have any objections.

A diploma from Yanbei University will never be more difficult to obtain than a diploma from Princeton.

"Don't worry, Professor Dugan, I write and revise papers very quickly. You can receive them today."

Qiao Yu replied immediately.

He was really not in a hurry to get the paper published, or for the honor of the special issue. The main thing was that he really didn't want to stay in Huaqing anymore.

It's okay to play the good boy once in a while, but being controlled every day is a headache. It would be more free to stay at Yanbei University, where he can do whatever he wants.

After all, he is only seventeen years old now, which is the age when he is rebellious! He has to be given a chance to do something. Talking to a bunch of old guys about mathematics every day is going to be boring to death.

Young people just need to be bold...
Chapter completed!