Then everyone knew.
There are many similar things, and the speed of information transmission on the Internet is unimaginable.
In just one hour, domestic institutions including the Academy of Sciences, Shuimu University, Donggang University and other institutions knew about the proof posted on Wang Hao's blog.
The news also quickly spread abroad.
However, because Wang Hao is not well-known internationally, few people care about "young mathematicians from other countries". Coupled with the limitations of China Unicom channels, someone took a screenshot and published the news, but it was not noticed by professional scholars.
Domestically, enough is enough.
In the Mathematical Science Center, Qiu Chengwen was sitting in the office, carefully checking the content published by Wang Hao, and while following it, he was doing calculations with a pen.
He can understand much faster than Luo Dayong.
Even though the two pages of proof contained some difficult mathematics, to Qiu Chengwen, it was the same as ordinary mathematics.
It only took him ten minutes to understand the contents, and he somewhat understood why Wang Hao called it a 'small study'.
This is indeed a very small study, the whole process only takes two pages, and it does not involve too advanced mathematical concepts. The only difficulty is the derivation of limit convergence.
The derivation of this limit convergence is the essence of the entire proof.
It is precisely because of the derivation of limit convergence and converting the problem from infinite to finite that we can demonstrate that 196 cannot become a palindrome number no matter how many transformations it takes.
"This method is really ingenious, a genius idea!" Qiu Chengwen commented, and then he found a person in charge and asked him to announce that the Mathematical Science Center approved Wang Hao's counterexample proof of 196.
For any mathematical argument, recognition by influential institutions in the field is very important.
Because many mathematical proofs are obscure and difficult for even professional mathematicians to understand, whether the proof process is correct depends on the evaluation of professional institutions in the field.
Even the counter-example proof published by Wang Hao is definitely not something that ordinary people can understand. They must have a knowledge base in the field of advanced mathematics.
This can defeat more than 99.9% of people.
This is just a proof that does not involve complicated content.
Speaking of complex arguments in the mathematics world, the most famous one is the proof of Fermat's conjecture by Eagle Country mathematician Andrew Wiles. The proof process totaled more than 100 pages and required six reviewers to review each part.
When Andrew Wiles first released his results, he made three reports at the famous Newton Institute, but the proof process was still not confirmed.
So how to determine whether this complex proof is correct?
This can only be judged by the institution.
Internationally speaking, among the top mathematical institutions, including the Clay Institute, the Newton Institute, the Institute for Advanced Study at Princeton University, etc., as long as a certain proof is recognized by two or more institutions, it can basically be confirmed to be correct.
.
Even if the proof process is incorrect, no one will deny it unless one day someone actually points out the error.
The Mathematical Science Center of Shuimu University also has a certain influence in the world. They issued a confirmation that Wang Hao's proof is correct, and it also has a certain authority in the world.
Domestically, it is more authoritative.
After the Mathematical Science Center of Shuimu University issued the announcement, more professional mathematicians got the news and immediately went to check the paper posted by Wang Hao on his blog.
This chapter is not over yet, please click on the next page to continue reading! When a blog article receives so much attention, the number of blog views will increase significantly, and it will also arouse heated public opinion.
soon.
There is an additional piece of news in the hot search on the Internet, "Wang Hao refutes the palindrome number conjecture".
Even if most netizens can't understand the content, they can't stop their enthusiasm from commenting, "This is the master! Has he proved a mathematical conjecture, but it's just a small study."
"Others post blogs to talk about their mood, life, and social events. Professor Wang Hao directly posts his mathematics papers, treating his blog as an academic journal..."
"I really improved my knowledge today. I learned one more mathematical conjecture, and it's still wrong. I hope this knowledge can help me get a perfect score in my math test!"
Scholars in the field of mathematics all feel that it is too wasteful for Wang Hao to publish his research on the Internet.
If it were them, they would at least publish it at conferences, which would increase their reputation, or submit it to a mathematics journal, or even a top mathematics journal.
Many scholars think so, including the mathematics professors at Xihai University.
For example, Zhou Qingyuan.
Zhou Qingyuan was very concerned about Wang Hao. After learning the news, he came over directly and said, "Don't you plan to publish a paper on your new results? Can it be of the level of a top journal?"
"Is it difficult?"
Wang Haodao said, "This kind of small proof only has two pages of content. It can be published directly. Moreover, publishing it on the Internet should not affect the publication of the journal. If a journal is interested, I can also publish it."
Zhou Qingyuan noticed Wang Hao's nonchalant look and couldn't help but twitch his lips. He also studied the content of the paper and found that the core was indeed only a clever limit transformation.
However, the results are impressive!
Although it is just a clever limit transformation, does it really prove the palindrome conjecture?
However, Wang Hao had already published it on his blog and stated that he would not refuse to publish the paper in journals, so he had nothing to say.
After Zhou Qingyuan left, Wang Hao continued to do research. He glanced at the inspiration value displayed on the system task and couldn't help but feel a little depressed.
【Task 3】
[Inspiration value: 94 points.]
He just used some small ideas from research to prove that the counterexample of 196 refutes the palindrome conjecture, and this research only increased the inspiration value by two points.
Wang Hao’s goal is to complete the research on the entire mathematical method.
The direct application of this mathematical method is to prove the Kakutani conjecture. There is no doubt that compared to the palindrome conjecture, the Kakutani conjecture is the real big result.
When he continued to work hard on research, he always found that he could not prove Kakutani's conjecture. What was missing was just a last-minute inspiration.
"Do we have to wait for class?" Wang Hao felt a little depressed, because his fastest class was also next week.
I feel like I can’t wait!
"How about researching other related content?" Wang Hao thought, found a very interesting numerical problem, and then slowly began to research it.
This is at noon.
After Zhang Zhiqiang had lunch, he returned to the office and saw Wang Hao busy with research. He asked curiously, "What kind of research is this? Didn't you just disprove the palindrome conjecture?"
Wang Haodao, "Let's do a small study. I want to prove the 6174 conjecture."
The content of the 6174 conjecture is also very simple. Given any four-digit number, rearrange the four numbers from large to small into a four-digit number, and then subtract its reverse number to get a new number.
If the new number is not 6174, continue the previous loop.
If this continues, no matter it is any four-digit number, as long as the four numbers are not exactly the same, if the above transformation is performed up to 7 times, the number 6174 will appear.
This research is also known as "Martin Conjecture-6174 Problem" in the international mathematics community.
Zhang Zhiqiang thought for a moment and said, "6174 conjecture? That's not a conjecture anymore, right? Computers can easily cover it directly."
"So I want to prove it using mathematical methods." Wang Hao said matter-of-factly.
Zhang Zhiqiang gave him a thumbs up and didn't pay much attention. He returned to his seat and began to listen to music to relax. It was only at 1:30 that he had the intention to do some research, but he still couldn't help but open his thin book.
Go gossip about the news, especially the content about Wang Hao’s refutation of the palindrome conjecture. It’s also very interesting to read netizens’ comments.
Because...Wang Hao is around.
At this time, he opened the main page and saw a message posted by a follower--
"A small study to prove the 6174 problem..."
"??"
Zhang Zhiqiang was stunned for a moment. He turned his head mechanically and saw Wang Hao operating the mouse. He looked towards the computer screen.
really!
A new blog post called "A small study to prove the 6174 problem".
"You haven't finished the proof yet, have you?"
"Yes!" Wang Hao nodded.
Zhang Zhiqiang stared at him for a long time and murmured, "I feel... you are not proving a mathematical conjecture, but doing a mathematical problem, and it is the simplest kind..."
Chapter completed!