Everyone began to seriously study Qiao Yu’s proof process.
About ten minutes later, Tao Xuanzhi was the first to speak: "I have no more questions, this proof process is actually quite similar to what I thought."
After speaking, Tao Xuanzhi probably felt that just saying that was a bit awkward, so he simply uploaded so of his previous drafts to the conference room.
Qiao Yu glanced at Tao Xuanzhi’s proof process and felt much more comfortable. Hmm, it seems these reviewers are really not just finding faults or searching for counterexamples; so are even thinking about how to help him patch up this small flaw.
Though he said it was similar, Tao Xuanzhi’s approach still had so differences from his own.
For example, Tao Xuanzhi first assud that Modal Space M was compact, but its local structure might allow multiple modal paths Γi to have overlaps or intersections, that is:
Then by restricting specific constraints, to make f globally unique. However, Qiao Yu felt that Tao Xuanzhi’s thod was still too complex, with an additional process from local to global...
A while later, Peter Schultz and Pierre Derini both nodded, approving Qiao Yu’s proof.
Finally, Jas Maynard took off his glasses, turned on the microphone, and said: "Alright, I have no problems either. Congratulations, Qiao Yu, you’ve proven the Riemann Conjecture!"
Lott Degen, who had been listening silently, laughed and then also turned on the microphone: "Alright, it seems that none of the reviewers have objections anymore, so I will incorporate this portion of the proof into the paper.
Thank you, all reviewers, for your support. The Mathematical Yearbook plans to provide a special issue for Qiao Yu’s paper! Also, thanks to Qiao Yu for supporting us! Everyone has worked hard."
Honestly, at this mont, Lott Degen was feeling excited.
The paper proving the Riemann Conjecture was eventually published in the "Mathematical Yearbook."
"Wait... um, I have so more thoughts." As everyone was breathing a sigh of relief, Qiao Yu suddenly said.
Everyone’s gaze focused on Qiao Yu, though it was through the lens.
Especially Lott Degen, who was even a bit nervous.
"After thinking over the past few days, I’ve proposed three new conjectures that I’d like to add to the paper," said Qiao Yu with a blink of his eyes.
"Let’s hear it," Lott Degen imdiately replied.
"The first is the Pri Gap Symtry Conjecture. The specific description is that within any large range of pri numbers, the distribution of pri gaps has a certain symtry.
That is to say, there exists a natural number N and a symtric function f(x), for all pairs of pri numbers pn, pn 1 it holds:
Before anyone could react, Qiao Yu continued: "The second is the Modal Zero-point Conjugate Conjecture. On the modal path Γ∗, the zero point zn has a conjugate relationship ψ(zn)=p with the pri p, satisfying:
"The third is the High-dinsional Pri Projection Conjecture. For any pri p, there exists a high-dinsional mapping Φ:N→R^k (k≥3), such that within a specific subspace, the distribution of pris satisfies: ‖Φ(pn 1)−Φ(pn)‖=f(n), where f(n) is so recursive or periodic function."
Mr. Yuan had specifically ntioned to him, and so had Professor Zhang Shuwen, that mathematicians should not only be good at solving problems but also at proposing them.
So besides discussing the paper with these reviewers in recent days, Qiao Yu also proposed these three questions.
In short, these three questions are still related to the distribution of pri numbers. They are also Qiao Yu’s original intention in studying pris.
If all three conjectures could be proven, it would surely provide tools to master a quick thod for finding pris, regardless of how large the pri is, making it very practical.
Especially the first conjecture, if resolved, the Twin Pri Conjecture would be fundantally solved as well.
Of course, these are conjectures put forward around the Generalized Modal Axiomatic System.
In this respect, Qiao Yu can be considered to be fulfilling the ideas of these mathematical giants to promote the Generalized Modal Axiomatic System.
As for the paper being approved...
For Qiao Yu, this is a minor issue, after all, he has always believed his proof process to be flawless! Non-approval would surely an soone is coveting his achievents.
Fortunately, that didn’t happen! Of course, upon closer thought, it’s not likely to happen either.
After all, the thods he used are novel; no one else could prove them but him.
...
After a mont of silence in the conference software, it was Lott Degen who spoke: "Alright, Qiao Yu, you almost scared there. These conjectures can be placed in the conclusion of the paper. But make it quick, I’m already eager to announce this news."
Kindness overflowing.
After all, Lott Degen is still hoping for Qiao Yu to co to Princeton as a professor, although Qiao Yu’s current academic qualifications are still an issue.
Really, Lott Degen feels Tian Yanzhen and Yuan Zhengxin are too rigid. He simply can’t imagine that Qiao Yu is still an undergraduate.
Even at Princeton, known for its stringent graduation requirents, Qiao Yu’s current achievents would earn him a Ph.D. without any professor’s objections.
A degree from Yanbei University wouldn’t be harder to obtain than one from Princeton.
"Rest assured, Professor Degen, whether writing or revising papers, I’m very quick, you’ll receive it today."
Qiao Yu imdiately replied.
He really wasn’t in a hurry to have the paper published, or for the honor of the special issue. Mainly he truly doesn’t want to stay at Huaqing any longer.
Occasionally playing the good student is fine, but being supervised every day is headache-inducing. Being at Yanbei University is much more free, he can do as he pleases.
After all, he’s only seventeen now, the age of rebellion! He must have so opportunities to do things; discussing mathematics with a bunch of old folks every day would drive him insane.
Young people need to be unrestrained...
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