Chapter 349: Results released, prime number pairs, new directions in mathematics!
After many verifications, Wang Hao and others determined that "5 and 17' are a prime number pair node of the function. By substituting other prime numbers and solving the equation transformed from the function, another corresponding prime number can be obtained.
This discovery is very significant.
Until now, mathematics has not been able to find an equation that can definitely get the solution to prime numbers. Everyone realizes that functions may contain some rules for the occurrence of prime numbers.
They summarized the research and submitted the compiled paper to "New Advances in Mathematics", and then Wang Hao published a public message on the Internet.
That was the news released on Weibo.
Wang Hao's meager account has tens of millions of fans. Any news he releases can arouse heated discussions, and releasing relevant research progress can attract the attention of countless media.
When the news was actually released, it quickly attracted a lot of discussion.
The function presented by Wang Hao has been reported before, and he himself also publicly explained it. Later, he also issued a personal reward, announcing that anyone who made a breakthrough in the research of the function would be given a high bonus personally.
The bonus started from 100,000 yuan at first, and then gradually increased to 500,000 yuan.
The increase in the amount of bonuses can also be seen that Wang Hao attaches great importance to function research, and it can also show how difficult it is to study functions.
Wang Hao has always been one of the world's top mathematicians, especially in the fields of number theory and partial differential equations. It is not an exaggeration to say that he is "the first person, because he proved Goldbach's conjecture and solved the Millennium Seventh Problem."
One of the big mathematical problems is the NS equation problem.
For current function research, Wang Hao personally announced that he will provide bonus support, and the bonus is said to be starting at 500,000, which will naturally attract many scholars to participate.
However, research has made little progress.
Many scholars in the field of mathematics even believe that functions have no meaning.
Wang Hao suddenly announced a breakthrough in research, which naturally attracted a lot of attention, and even ordinary people were very concerned.
From the perspective of ordinary people, Wang Hao is different from other mathematical physicists.
What I’m talking about here is not his achievements, but his research fields. Many mathematicians and physicists are also at the forefront of science, but the content of their research is completely incomprehensible to ordinary people.
Many mathematicians are also doing cutting-edge research, but their research is incomprehensible to ordinary people and is basically out of touch with technology. Especially theoretical physics and basic mathematics.
For example, most of the research on basic mathematics can't even understand the title, so naturally they are not interested. Wang Hao is different.
Superconductivity, antigravity, are directly related to science and technology. Current research is also theoretical. It has indeed annihilated the most basic content of physics, especially the research on basic mathematics. Some of the top research in the disciplines are even difficult to understand the title.
Wang Hao's research is different. He not only studies theory, but also studies technology, anti-gravity technology, and superconducting theory. They are all direct scientific and technological research.
He led the team to build the most popular anti-gravity aircraft.
The function presented now is indeed incomprehensible to ordinary people, but it has been discussed once before, and many scholars have popularized Wang Hao's research, so people can naturally understand its significance -
"The study of Wang's function is related to the mass point structure."
"If we can complete the structure of the most basic mass point of annihilation physics, we can then connect the other three microscopic forces and achieve the grand unification of physics."
How amazing is this?
In the world of theoretical physics, string theory is also considered a grand unified theory, but almost everyone knows that it is impossible and that the grand unification of string theory is just a fantasy.
One reason is that many contents of string theory, including the eleven-dimensional space and the brane universe, sound a bit unreliable, difficult to bring close to real life, and deviate far from conventional physics.
In addition, it is very important that string theory has not been proven.
String theory believes that the basic unit of matter is string, but there is no experiment to verify it.
an unproven theory
Even if its theory can be unified, it is not certain whether it is true. The physics of annihilation is different.
Because it is directly connected to research in antigravity, superconductivity and other directions, the theory has been promoted to "physics" and is recognized by major international institutions.
Under this background, annihilation physics can achieve the unification of physics and will be recognized by many people.
In short, many people know that the function Wang Hao presented is of great significance.
Now that Wang Hao has publicly announced that there is progress in his research, he will naturally become the focus of public opinion, and the information he released is indeed very shocking.
"If my understanding is correct, Master Wang Hao is saying that after substituting several prime numbers, the transformed equation can still find prime numbers?"
"And there's more than one group!"
This point alone is astonishing enough. Even students in ordinary universities can roughly understand that there are many "prime number solutions" and how significant their significance is. This may indicate that the so-called "higher-order mass point function"
, that is, the 'Wang's function', which contains the law of prime numbers.
The law of prime numbers can be said to be the ultimate pursuit of basic mathematical research.
Many people know that there are no rules for the existence of prime numbers, but based on the principle of the existence of prime numbers, theoretically there are rules.
This is the contradiction.
Theoretically, there are rules for prime numbers, but in fact, no rules can be found at all.
Because of this, there are so many mathematical conjectures related to the existence of prime numbers in number theory.
Some mathematicians believe that "if we can crack the law of prime numbers, we can understand the underlying mysteries of the universe." This statement is not an exaggeration at all.
If you think about it from this perspective, you will know how shocking it is that Wang Hao published a content saying that there are multiple sets of 'prime solution points' for higher-order particle functions.
There are two contents explained at the end of the message. One is related to Wang Hao's decision to reward Zhu Kuiyang with 800,000 flower coins, which can be regarded as fulfilling his promise; the other is related to the release of results, and the research paper will be published together in the new issue of "Mathematics".
"New Progress".
This chapter is not over, please click on the next page to continue reading! At the same time, in the second article "Research on the Specificity of Higher-Order Particle Functions", Zhu Kuiyang will also be listed in the author column, and his contribution to the research will be specially explained.
With this, many people also discussed Zhu Kuiyang.
If a well-known scholar in the field of mathematics helps Wang Hao in research, it doesn't sound like a big deal.
It would be different if he was a PhD student. Many people exclaimed on the Internet, "Zhu Kuiyang is definitely a genius!"
"The Ph.D. students at Donggang Polytechnic are amazing, but the Mathematics Department of Donggang Polytechnic...ahem..." "It's really amazing. I can't imagine that I can help the great master Wang Hao in my twenties!"
"
Everyone knows that Zhu Kuiyang has a bright future.
However, in the field of mathematics, many scholars are also surprised by Zhu Kuiyang, but the truly top scholars are more concerned with the research of higher-order particle functions themselves.
no doubt.....
When a function is sure to have many 'all prime points', it is definitely very unusual. However, the information released by Wang Hao is also very vague. It is not sure whether there are 'countless all prime points' or only a few all prime numbers.
point.
The significance of the former is not at the same level as the latter. They did not wait long.
Wang Hao is no ordinary scholar, and his contributions will be published immediately.
Bruce Pulitzer, the editor-in-chief of "New Advances in Mathematics", is also an old friend. After Pulitzer received the submission, he knew what to do immediately.
Leave it intact and put it on the official website quickly!
In order to achieve the maximum effect, there is no charge even for papers placed on the official website. As long as you register as a member, you can download them directly.
So after waiting for less than a day, the introduction and download links of the two papers can be found on the homepage of the official website of "New Advances in Mathematics".
The name of the first paper is "Constructing higher-order particle functions based on Riemann functions", and the first author of the paper is Wang Hao.
Ding Zhiqiang and Qiu Hui'an were
Mark other contributing collaborators.
The content of this paper is very complex and describes the derivation process of higher-order particle functions.
The name of the second article is "Research on the Specificity of High-Order Prime Functions", which means that '5,17' is the prime number pair node of the function.
"We have done twenty-three verifications, and the numbers are 19, 29, 31..." "All verifications can correspondingly find another prime number."
This is an explanation of 'higher-order particle functions'.
The final summary of the paper also said, "23 verifications do not mean that it is 100% accurate, but we are not trying to prove a mathematical theorem, but to illustrate the specificity of higher-order particle functions."
Many mathematicians saw the content of the second paper and immediately began to verify it. Everyone was enthusiastic about it!
In just a dozen hours, mathematicians from all over the world published the numbers they had verified and said they had obtained another prime number.
Although the verified numbers do not exceed one thousand, to a certain extent, the pattern can be explained. 5 and 17 are indeed the prime number pair nodes of the function.
When a function contains countless all-prime number points and the distribution is very dense, it cannot be described as coincidence.
Of course, mathematics is a rigorous subject.
Many institutions are organizing special teams to conduct further verification, and the numbers they have verified exceed 1,000.
Such verification is more convincing.
If it is only verified by solving the problem, it will be very difficult to substitute larger prime numbers. After all, the running speed of the human brain is limited.
Some institutions wanted to make a plane image of the corresponding function after substituting '5 and 17', but they soon found that they could only make an approximate image, because after substituting individual numbers, in most cases, the computer simply cannot
It cannot be solved directly.
At this time, the top mathematical community is focusing on another issue——
"High-order particle function, are there other prime number pairs of nodes?"
"How many prime number pairs are there in the function? Is it a fixed number or an infinite number?" These two questions are so attractive.
5 and 17' are a prime number pair node of a higher-order particle function, so are there other prime number pair nodes? Many teams have begun to study the problem.
In fact, just like Mersenne prime numbers, mathematicians can find out the rules of Mersenne prime numbers and are interested in discovering Mersenne prime numbers.
A top mathematician commented, "The study of prime number pairs of higher-order mass point functions is likely to become a major direction of prime number research in the future."
"This alone is enough to show that higher-order particle functions, also known as Wang's functions, have extraordinary mathematical research value!"
Donggang Polytechnic University.
Ever since Wang Hao released the news, Zhu Kuiyang's life has completely changed.
Zhu Kuiyang was in a very embarrassing situation before. He hoped to continue to engage in mathematics research, but he could not stay in school to engage in teaching and research.
If he can't stay in school, he can only go to a much inferior school, or go out to find a job and change his industry completely. It's different now.
Several powerful deans at Donggang Polytechnic University, including department leaders, came over to talk to Zhu Kuiyang in a friendly manner, persuading him to stay at the school and promising to be promoted to associate professor after one year of work.
The reason for working for one year is because of the requirements of the associate professor, who needs to engage in teaching work for one year.
Now the school is afraid that Zhu Kuiyang will leave directly. By then, it will not only be a loss of talents, but the reputation of the school may also be damaged.
Zhu Kuiyang not only helped Wang Hao's research and signed the most popular mathematics paper, he also became a "recognized genius."
If Zhu Kuiyang graduates and leaves school, it may cause some public controversy!
Zhu Kuiyang felt like it was a dream. He was confirmed to be able to stay in school and received an RMB 800,000 bonus from Academician Wang Hao, making him the envy of his classmates.
This chapter is not finished yet, please click on the next page to continue reading the exciting content! Even...
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Even before he officially graduated, the school "urged" him in advance to let him think about the research topic after taking up the job, and confirmed that it would provide financial support.
This kind of treatment is simply unthinkable!
Zhu Kuiyang was not worried about the subject at all. He had already decided to study Wang's function.
This direction is what he likes. Wang's function is also a brand new direction in mathematics and is likely to become a popular direction in the future.
Engaging in relevant research now can be regarded as one of the first steps to take action.
There are many scholars who hold similar ideas to Zhu Kuiyang. Every scholar knows that Wang's function has great potential and contains rich treasures.
Now is the early stage of mining. It is easier to dig out better content in the early stage. You must hurry up!
Many teams think the same way, not just teams in mathematics, but also teams in computer science. The Wang function is very complex, and it is very, very difficult to research something by relying on mathematical means.
Computers are different.
Wang Hao's second paper directly helped some teams point out the direction.
A team from Stanford University determined the direction almost on the same day. They wanted to verify the prime numbers within one hundred thousand to see if there are other prime number pairs of nodes of the function among the numbers within one million.
The method of this research is also very simple, that is, using a computer to perform coverage verification.
No matter how complex the function is, it is only a four-variable function, and because of its particularity, you can first substitute a minimum odd prime number 3', and then fix the two prime numbers as 'prime number pair node candidates' to transform the function into a complex equation.
.
The next step is to perform coverage verification.
The computer does not need to analyze the converted equation, but directly substitutes it into the equation. Starting from the number "3', verify 3, 5, 7... and even go to more than one million prime numbers to see if there are any numbers that can make the equation
The calculation results on both sides are the same.
The results are the same and recorded.
If the results are different, you can verify the next set of prime number pair node candidates.
This calculation method is very fast, and writing the program is relatively simple. The only thing is that there are a large number of prime number node candidates that need to be verified.