Chapter 350 Wang Hao: Im not interested in mathematics!
Saikai University.
Wang Hao is busy accepting all kinds of congratulations and praises. Even though the research results have only just been published and have not been confirmed, the mathematics community also knows that it is of great significance.
Looking back ten years ago, some scholars believe that there have been no major breakthroughs in mathematics and physical theory for many years.
Later, the emergence of annihilation theory made a huge breakthrough in physical theory, brought about new scientific and technological development, and found a clear direction for human science and technology.
But the basic theory of mathematics has not developed much. In fact, if you think about it carefully, you will understand.
For example, most people spend their entire lives studying mathematics from hundreds of years ago, and the so-called top research in mathematics are all problems discovered a hundred years ago.
In recent decades, only "young subjects" such as algebraic geometry have produced many valuable breakthroughs, as well as some new problems.
In other mathematics disciplines, at most they only solve some problems but do not raise new ones.
Top mathematicians have been discussing the issue of stagnation in the development of mathematical theories, but of course there will be no results unless there are new breakthroughs in mathematical research.
Now Wang Hao has brought a new breakthrough. He said that the high-order particle function created is likely to bring huge promotion and development to the study of digital laws.
Many top international scholars have called the result "a huge breakthrough in the study of prime numbers."
Some well-known institutions roughly define the study of higher-order particle functions as "Wang's conjecture," the main content of which is the analysis of Wang's functions.
Of course.
This is just a conjecture. Wang Hao's research has not been confirmed, mainly because it cannot be confirmed. Mathematics is a very rigorous subject.
Just like the Riemann Hypothesis, research that has not been confirmed can only be a conjecture. No matter how much verification is done, it cannot be confirmed as long as a complete logical proof is not formed.
But this does not affect the value of the results.
Many scholars couldn't help but sigh, "Wang Hao is indeed Wang Hao." In the past two years, Wang Hao did not produce top mathematical results and devoted most of his energy to physics and technology research.
Some scholars believe that Wang Hao has abandoned mathematics.
In fact, it is quite normal. The achievements of most genius mathematicians are concentrated in more than ten years, rather than having top results in a lifetime. Wang Hao's results are shorter, only a few years, but he has completed them one after another.
The famous Goldbach's conjecture and NS equation problems were solved. Others include Kakutani's conjecture, research on Artin's constant, etc.
The emergence of these studies was concentrated within a few years. Subsequently, they only made progress on the Hodge conjecture together with others, and the rest were achievements in the direction of physics.
It only took Wang Hao a few years for his personal mathematics performance to reach its peak. It was very normal for him to turn to physics and technology. Under general rules, even if he continued to do mathematics research, it would be difficult to make major breakthroughs.
Obviously.
Wang Hao used facts to prove that he did not conform to the general rules of a 'genius mathematician'. His first move was the 'Wang's function', which directly led to major breakthroughs in the study of prime numbers.
This is not just a breakthrough, but helps guide the direction of prime number research.
This was naturally considered a "top achievement", and many people I knew sent congratulations.
Wang Hao also attaches great importance to the study of higher-order mass point functions, but the reason for his emphasis is not on its mathematical significance, but on the direct correlation between higher-order mass point functions and mass point construction.
The latter is the most important.
Wang Hao hopes to use this to further construct mass points. No matter when, mathematics is just a tool, and physics research is directly related to technology.
Now he is no longer a pure mathematician.
"But before the next breakthrough in function research is achieved, it is almost impossible to find a direction." This is the headache.
Wang Hao finished writing a reply email, shook his head and looked at Ding Zhiqiang in front of him, with a hint of hatred in his eyes.
Ding Zhiqiang came over.
He was talking about a doctoral thesis.
Previously, Wang Hao rejected Zhiqiang's doctoral thesis, saying that he would work with him on the research, and the results would be used as the content of the doctoral thesis.
Now the results have been achieved.
Ding Zhiqiang is also listed as a 'collaborator' of the research and one of the authors of the paper.
So Ding Zhiqiang wanted to use the content of one article as his doctoral thesis, and what he said was well-founded, "Teacher Wang, I have also contributed to research, and I compiled part of the content, which can be used as a graduation thesis...
.”
"no!"
Wang Hao hated the iron and said, "Of course this research is very important, and your contribution is not small. I also marked it on the paper, but what can you summarize?"
"If you take some of them, are they all what you researched?" This is the question.
Although Ding Zhiqiang did provide a lot of inspiration, the problem is that even he himself does not know most of the content, let alone sorting it out. Ding Zhiqiang’s definite contribution is to work with others to do verification calculations and analyze
Some complex equations.
After sorting out these contents, one can certainly be qualified as a doctor, but it will definitely be very mediocre.
Wang Hao felt that it was completely inconsistent with Ding Zhiqiang's level. For anyone who hopes to engage in scientific research in the future, a doctoral thesis is very, very important.
Ding Zhiqiang....
The lowest, the lowest, we still need to do research in top journals, right?
Wang Hao pursed his lips and said, "Well, Zhiqiang, I won't make it difficult for you. As long as your paper reaches the level of the top four international journals, I will agree."
?」
Ding Zhiqiang opened his mouth, with surprise written all over his face. Top magazine?
Not difficult?
He didn't know how these two words were related, but thinking that the person in front of him was Wang Hao, a big boss who casually published papers in top journals, he struggled for a long time, and finally he could only nod with tears in his eyes.
After he walked out of the office, his face was full of confusion and helplessness, and he didn't even know whether he would be able to graduate in this life.
"I should have known..."
"well!"
Zhang Zhiqiang happened to come over. He glanced at Ding Zhiqiang and said hello, "Xiao Ding, you just came out? What's wrong?" "I..."
When Ding Zhiqiang was about to say something, he heard Qiu Hui'an humming next door, "I want to go back to the past and try to let the story continue..."
"It's the same as what he sang." "??"
Zhang Zhiqiang didn't understand it at all. He simply ignored it and went directly into Wang Hao's office and shouted, "Wang Hao, new progress!"
"What?" Wang Hao raised his head in confusion. Ding Zhiqiang also came to the door.
Zhang Zhiqiang said, "Your function has made new progress! A team from Stanford University discovered the second set of prime number pairs of nodes, which are 211 and 457!"
After hearing this, Wang Hao stood up suddenly, and at the same time, a system prompt came to his ears - [Task 2, Inspiration Value +3.]
"Found it, so fast?" Wang Hao was immediately surprised. Then Zhang Zhiqiang took out his mobile phone and showed the foreign news reports.
This report has just come out and has not reached the country yet.
Zhang Zhiqiang used a proxy server to read foreign academic news and noticed it, and immediately came over to talk to Wang Hao.
Wang Hao saw the report and knew why it was so fast. The Stanford University team found a clever way to use the prime number covering method to use the stock supercomputer to do the calculation. It didn't take long to calculate the next set of prime number pairs.
node.
The team also confirmed in the interview, "We have completed the calculation of prime numbers within 1,500 and found a set of numbers '211 and 457'."
"At the same time, we also found that no matter whether we substitute '5 and 17' or '211 and 457', the corresponding prime numbers obtained by solving the single prime numbers still seem to have no rules..."
Anyway, the second group
The discovery of prime number nodes also gave Wang Hao a new node in his research.
This was mainly due to the identification of a problem—high-order mass point functions have more than one set of prime number pairs of nodes. Soon the news spread to the country.
Many people know about the second set of prime number pairs of nodes of higher-order particle functions, and are also surprised by the efficiency of the Stanford University team. You must know that it was only three days before Wang Hao's paper was published. As a result, the computer team of Stanford University all
New results have been produced, and the methods they used are quite clever.
This kind of achievement... is really enviable!
Many people and teams immediately focused on higher-order particle functions. They knew very well that after they had a new research direction, no delay was allowed at all. They had to find the direction as soon as possible and conduct research quickly to achieve results.
Otherwise, the results will be obtained by others. Wang Hao fell into thinking.
The discovery of the second set of prime number pair nodes will definitely promote research, but it is almost impossible to find out the rules for the occurrence of prime number pair nodes based on functions.
Just by looking at the two sets of numbers, you can see that the combination of prime number pairs of high-order particle functions is just like Mersenne prime numbers and twin prime numbers, and there is no rule at all.
This is of course not 100%, but even if there is a certain pattern, the difficulty of studying it is S++ level. If the pattern of the appearance of prime numbers on nodes cannot be studied, the high-order mass point function cannot be fully understood.
So how to contact the quality point construction problem? Prime number distribution....
Quality point.
Wang Hao began to seriously think about the relationship between the two.
·......
The Stanford University computer team discovered the second set of prime number pair nodes, which also gave the study of higher-order particle functions a second round of international public opinion.
Many people are talking about higher-order particle functions.
Some top scholars have come forward and said that higher-order particle functions are a major breakthrough in mathematics.
The famous mathematician Andrew Wiles, who is nearly seventy years old, has left the Institute for Advanced Study in Princeton and returned to a rural town in London to retire.
When faced with the problem of higher-order particle functions, Andrew Wiles also stood up and said in an interview, "Higher-order particle functions are uncertain. It is really a conjecture at this stage, but it may contain the law of prime numbers.
.”
"Even so, its emergence is of great significance to mathematical research."
"If you give a description...even if ten Fields are added together, it is not enough to explain its role in basic mathematical research."
This evaluation is indeed very high, but it is also recognized by other mathematicians.
At the same time, Andrew Wiles also raised two questions, "Many people are talking about Wang's mathematical conjecture now. In fact, the research on higher-order particle functions can be divided into two questions."
"One problem is to prove that a single prime number pair node is valid for all prime numbers. Many people have participated in the calculation of prime number pair nodes. We can determine the prime numbers within one thousand, and the corresponding prime numbers can be found by substitution, but one thousand
What about the above? Or what about very large prime numbers?”
"This must be proven."
"We can consider this question as the first question of Wang's conjecture."
"The second question of Wang's conjecture is, the number of prime number pairs of nodes, just like twin prime numbers, is there a finite number or an infinite number?"
"This also needs to be proven rigorously."
"I personally have also done research on higher-order particle functions, and found a problem that I don't know if it is a problem." Andrew Wiles raised his own question, "In higher-order particle functions, is there a non-total prime number point?"
full integer node?"
"At least so far, I haven't found any..."
Andrew Wiles was interviewed and summarized two questions about higher-order particle functions, and he personally raised a new question.
After the report was released, the three questions he raised were recognized by many scholars.
Of
After being quoted in many reports, Wang's conjecture was divided into three parts, as the first question, the second question and the third question of Wang's conjecture.
More scholars realize that higher-order particle functions contain many directions that can be explored. They can use this to make research breakthroughs.
At the same time, some scholars think about the 'Wang Conjecture' and feel it is a bit strange.
"Wang's Conjecture" has such a huge influence that it is considered to point out the direction of prime number research. The study of prime numbers on nodes has also made rapid breakthroughs.
There will definitely be new breakthroughs in the future, such as finding the third set of prime number pair nodes.
Now it has been divided into three problems, which will definitely attract a large number of scholars in number theory, function theory and other fields to participate in research. In the future, its influence in the field of mathematics may surpass the Riemann Hypothesis.
Historically speaking, this kind of major mathematical problems were often raised by older mathematicians, or were discovered in the relics of a certain mathematician.
It's different now.
The high-order particle function was created by Wang Hao, and Wang Hao was just over thirty years old and had just entered his peak period as a mathematician, so...
For research questions, wouldn’t it be better to ask Wang Hao directly?
Several professors from the Institute of Mathematics of the Academy of Sciences thought so. They discussed it back and forth, not sure what direction to study. Later, Professor Du Haibin simply said, "I'll give Wang Hao a call!"
Others reacted immediately.
They are not sure what direction to look for for research, but they can just ask Wang Hao himself!
If we talk about the understanding of higher-order particle functions, who else can compare with Wang Hao who shaped the function?
Du Haibin and Wang Hao have met several times and can be considered academic friends. He has Wang Hao's contact information, but if he wants to get through the phone, he still has to talk to Chen Mengmeng first.
When Chen Mengmeng heard that the other party was a professor at the Institute of Mathematics of the Academy of Sciences, he simply came to the office and handed the phone to Wang Hao.
Du Haibin was not embarrassed. He just wanted to discuss the issue of higher-order mass point functions with Wang Hao, and he also hoped that Wang Hao could point out a good direction, so he simply asked directly, "Academician Wang, I want to ask about higher-order mass point functions."
Research question. Currently, the international mainstream talks about three issues. Which direction do you think is better?"
He was referring to the three issues summarized by Andrew Wiles.
After hearing this, Wang Hao hesitated and said, "I saw the report. Wiles said it makes sense. These three problems do exist."
"If you let me choose...it's okay." "Huh?"
This answer is really unexpected.
Wang Haodao, "The study of prime numbers on nodes is a good direction, and rigorous proof covering all prime numbers is also a good direction. However, I personally pay more attention to prime numbers on nodes, but doing mathematical research is different."
"What do you mean?" Du Haitao was a little confused.
Wang Hao explained, "Mathematically, it is indeed a good direction to prove that the function transformed from prime numbers to nodes can cover all prime numbers, but it has nothing to do with my main direction."
"Prime numbers are directly related to nodes. But when you do research, you still have to find your own direction..."
"I don't care much about rigorous proofs. To put it bluntly, Professor Du, I am not planning to continue research, but I hope to start from the prime number pair node to connect the problem of mass point construction."
"But I sincerely hope that the research on higher-order particle functions can achieve more breakthroughs." Du Haitao understood this time.
He was silent for a long time with his lips drawn, and for a moment he didn't know what to say.
Wang Hao talked about a lot of content related to higher-order mass point functions, and also briefly talked about his own mass point research, but it can also be simplified into a few sentences-
I just proposed higher-order mass point functions, but I mainly studied mass points and was not interested in subsequent research in mathematical directions.
Simplify it again...
I'm studying physics and I'm not interested in math. "In other words...
Du Haibin put down the phone and explained to others
"What Academician Wang means is that the reason why he studied higher-order mass point functions was just to construct mass points."
"Mathematics is just a tool for research..." "He is not interested in mathematics..."
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