Not because Qiao Yu solved the century-old problem of the Riemann Conjecture, but because the impact of the Generalized Modal Axiomatic System is too profound.
With the help of this system, over the years, many mathematics research institutions worldwide have made significant progress in researching nurous complex problems.
For instance, so teams have proven the four-color problem through Qiao Algebraic Geotry thods. However, the paper is currently under review.
But according to the reviewers, the possibility of passing is very high.
Originally, Qiao Yu was one of the most ideal reviewers, after all, the thod used was pioneered by him, but unfortunately, Qiao Yu directly declined.
For other mathematicians, being able to review such groundbreaking papers is an acknowledgnt of their proficiency.
It also allows them to be the first to interact with and verify new thods they are interested in.
But for Qiao Yu, reviewing such matters is purely a hassle.
This is probably one of the reasons why Yuan Zhengxin and Tian Yanzhen recently felt that Qiao Yu was having it too easy.
However, from this mont on, everything is about to change again.
...
Zhu Zhengze arrived at the headquarters of the International Mathematical Union early in the morning.
This building, located in the city center of Berlin, belongs to the Eulerstrass Institute for Applied Analysis and Stochastic Research.
As a mber of the Mathematical Standards Committee, mathematicians naturally don’t have ti to work like ordinary people.
But the committee has many chores that need handling, such as coordinating and guiding academic activities.
These chores are highly specialized, and ordinary people simply cannot handle these tasks, so a rotational system is implented.
Every committee mber needs to spend so ti here within these four years to complete those trivial administrative tasks and make specialized decisions.
In the next half-month, it is Zhu Zhengze’s turn to be on duty.
Sitting in his office, brewing a cup of tea, Zhu Zhengze opened his email.
Although he has to be busy with committee work, as a doctoral supervisor, he cannot completely ignore school matters.
Fortunately, with the developnt of the internet, most situations can be resolved via email.
Moreover, the International Mathematical Union recently replaced the office computers for the three main committees and the secretariat with Huaxia’s Tai Chi Series.
By utilizing the updated multidinsional conference system, hosting so small etings online has beco easier, and information security is better handled.
Combined with holographic reality, it can be more realistic. The only problem is the ti difference.
However, Berlin Sumr Ti is only six hours different from Huaxia.
Every day at nine in the morning, he arrives at the office, which is three in the afternoon Huaxia Ti, just right for the afternoon work hours, making communication quite convenient.
Zhu Zhengze opened his email as usual, and at first glance, he saw the subject marked in red.
Seeing the sender, it turned out to be an email from Academician Tian to him. He imdiately opened the email.
No way around it, Tian Yanzhen’s current status in Huaxia’s mathematics community is truly special.
Not just because he is considered by many to be just a step away from the Fields dal, but also because he has a student nad Qiao Yu.
In Huaxia, while engaging in mathematical research, it doesn’t matter if you offend anyone, but you must never cross the big nas from the line of Huaqing and Yanbei.
Zhu Zhengze thinks this is quite well. Because he belongs to the Yanbei System and is a vested interest.
Including how he was selected into the committee, Yanbei University also played a role.
So naturally, for a local big shot like Tian Yanzhen from the sa school, respect cos even more.
"Professor Zhengze: Attached is Qiao Yu’s latest research findings. You need to carefully study it in comparison with the widely discussed open letter from Tao Xuanzhi concerning Qiao Yu. It’s best to organize a temporary eting for discussion. If you have any questions, feel free to call ..."
The email is just a few words.
But it was enough to capture Zhu Zhengze’s attention.
After all, Tian Yanzhen made it very clear that the attachnt is Qiao Yu’s latest research findings!
Recently, the open letter directly transferred to a blog by Tao Xuanzhi has been a hot topic in the entire mathematics community.
As far as he knows, several mathematics research institutes have already started working on tackling the viscosity term problem.
After all, partial differential equations have long been a popular direction in mathematics research.
If Qiao Yu’s thod proves to be valid, it could not only solve the N-S equations issue but also unify the equation handling approaches across multiple fields, even providing new nurical simulation thods.
For instance, it could lead to a novel deconstruction of partial differential equations like the N-S equations, converting previously unmanageable nonlinear terms into computable geotric invariants.
In mathematics, the greatest significance of solving a difficult problem is not the problem itself, but the innovative mathematical thods and tools it creates for future generations, allowing the discipline of mathematics to continue advancing.
For many mathematicians, perhaps the greatest lifelong wish is to enable mathematics to truly penetrate into the real world.
Though this work in particular needs the involvent of physics, what if mathematics can truly achieve a systemic takeover of the real world?
At this point, Zhu Zhengze was no longer focused on other emails, took a deep breath, and directly downloaded the attachnt.
Goodness, a pile of formulas stacked together. Each formula is accompanied by just a few explanations.
For those who have not studied the Generalized Modal Axiomatic System and Qiao Algebraic Geotry, these formulas probably appear like an unreadable scripture.
Fortunately, Zhu Zhengze has been studying this field for six years. Currently, in Huaxia, he is one of the people delving deepest into Qiao Algebraic Geotry.
His paper "Q-Cohesion and Serre Duality Theorem of Qiao Cohomology" was directly selected as one of the core reference literatures for the ICM-2030 conference report and invited him to deliver a 60-minute presentation at the mathematics conference.
Another paper, "p-adic Qiao Algebra Rigidity Theorem and Langlands Quantization Correspondence," was directly incorporated by many schools of mathematics including Yanbei, Huaqing, and Princeton as mandatory reading for algebraic geotry doctoral students.
This is also the reason he joined the Mathematical Standards Committee.
In recent years, although Qiao Yu has not exerted much force in mathematics, many mathematicians like Zhu Zhengze have been helping Qiao Yu in advancing and enriching the entire theoretical frawork.
Especially the confirmation of standards could not do without the tireless efforts of nurous mathematicians like Zhu Zhengze in their pri.
So when the attachnt was downloaded, Zhu Zhengze, who started to think with his heart, could transition into the state faster than Tian Yanzhen.
Obviously, this is a continuation of the thought process after Qiao Yu wrote that letter to Tao Xuanzhi.
From the first formula given by Qiao Yu, Zhu Zhengze knows that it is addressing the problem of viscosity terms.
And the path of thought remains as unrestrained as ever...
During this period, Zhu Zhengze had also been contemplating this issue. Of course, Tao Xuanzhi publicly shared the letter, initially intended to invite more mathematicians to participate, to brainstorm and collaboratively solve this challenging problem.
But at this mont, Zhu Zhengze only felt that his way of thinking was too traditional!
From Reynolds number analysis to boundary layer approximation, then regularity estimation, and attempting to perform singular perturbation expansion...
But Qiao Yu completely deviated from these traditional approaches and took a different route, directly geotric-paraterizing the viscosity terms.
More specifically, Qiao Yu directly reinterpreted the viscosity term in the traditional N-S equations.
He created a fiellation neighborhood centered on x on a manifold, making the viscosity coefficient no longer a fixed constant, but dynamically coupled with the local geotric structure...
With this step, the original equation can be directly transford into a recursive equation group of an infinite-dinsional Lie algebra, with each recursive level corresponding to different scales of vortex structures...
Seeing only about half the formulas, Zhu Zhengze was completely shocked!
Honestly, at this mont, he simply couldn’t imagine what kind of mind could conceive of such a way to simplify complexity to solve this problem he once thought would trouble the world for at least another century!
Although he hasn’t finished looking through it, just from this thought process, he is already convinced that Qiao Yu must have solved the problem he himself had just posed!
Is this so kind of self-questioning and self-answering ga?
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