Chapter 585: Operation status
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Super Island Tycoon
- Niao Shilang
- 1131 characters
- 2021-02-01 04:19:55
So Jiang Cheng's final choice is clear at a glance, which is to solve and prove the Riemann hypothesis.
The Riemann hypothesis is a hypothesis put forward by the mathematician Riemann in 1859. It is a hypothesis about prime numbers.
There are some special numbers in natural numbers, which cannot be expressed as the product of two smaller numbers.
That is to say, this kind of number cannot be obtained by multiplying two numbers, this kind of number is called a prime number.
For example, 3 is a typical prime number. Any two natural numbers less than 3 cannot be multiplied to get 3, and 4 is not a prime number because 2 times 2 equals 4.
Prime numbers are quite common among natural numbers. The equivalent words 2, 5, 19, and 137 are all prime numbers. The Riemann hypothesis is the hypothesis about this prime number.
The distribution of prime numbers in natural numbers looks very messy. At first glance, there is no distribution law for prime numbers.
But Riemann, the great mathematician, proposed a complex function, which is called the Riemann zeta function.
Riemann believes that the zeta function he discovered is related to all prime numbers.
In other words, all prime numbers can be expressed as this function, and prime numbers are not randomly distributed but regular.
The zeta function is the law of the distribution of prime numbers. This function can help people find all prime numbers.
Riemann’s hypothesis aroused the attention of all mathematicians as soon as it appeared, because prime numbers are very important to mathematics, and this is the most basic part of mathematics.
If this Riemann hypothesis is correct, it can greatly improve the development of mathematics.
However, the hypothesis put forward by Riemann is only a hypothesis, not a proven axiom, so it cannot be applied to mathematical research.
So many mathematicians have begun to study this hypothesis, hoping to prove the correctness of Riemann's hypothesis.
It is a pity that the research of these mathematicians has not yielded any results. The Riemann hypothesis is still a hypothesis and has not been proved by anyone.
Even the proponent of Riemann's hypothesis cannot prove the correctness of this hypothesis.
More than one hundred and fifty years have passed in this way. During this long period of time, countless talented mathematicians have wanted to solve this problem.
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But after so many years, Riemann's hypothesis has still not been proven.
Since Fermat's Last Theorem was proved, the Riemann hypothesis has become the most famous problem in mathematics, and it has also become the most difficult mathematical problem in the world.
Jiang Cheng valued the popularity of the Riemann hypothesis, and it is the most difficult problem, so he chose to solve the Riemann hypothesis.
Although Riemann's hypothesis is the most difficult mathematical problem, Jiang Cheng is scared at all and full of fighting spirit.
For Jiang Cheng, difficulty has never existed.
For Jiang Cheng, no matter how difficult the problem is, it can be solved, just how much time it takes.
There have been many people who claimed to have proved the Riemann hypothesis before, but unfortunately, in the end, these proofs were proved to be wrong.
In 2015, there was also a mathematician from Nigeria who claimed to have proved the Riemann hypothesis, which caused quite a stir at the time.
It is a pity that the Fang Kecai Institute of Mathematics did not recognize the achievements of this mathematician. It seems that his research must have problems.
As soon as Jiang Cheng decided to study the Riemann hypothesis, he found the Nigerian mathematician's thesis and began to study it.
He quickly found out what was wrong in this paper. The Nigerian mathematician had a wrong direction from the beginning, so the whole paper was wrong.
No wonder the work of this Nigerian mathematician has not been recognized by the Kecai Institute of Mathematics.
It turned out that there was a problem in the fundamental direction. No wonder his research has not been recognized by the international mathematics community.
After finding out what was wrong with this paper, Jiang Cheng quickly put the paper aside.
This erroneous essay is of no use to Jiang Cheng, even to inspire ideas.
Although the Nigerian mathematician’s thinking was wrong, Jiang Cheng himself could not find any correct solution.
Jiang Cheng sat on a chair and thought for a long time, but could not find a solution to Riemann's hypothesis.
But Jiang Cheng’s current situation is quite normal, if Jiang Cheng can come up with a solution at any time.
Then this "four seven three" problem will not be called the most difficult mathematical problem at present. It has not been proved by anyone for more than 150 years.
After thinking about it for a long time, Jiang Cheng didn't have any clues, so he was going to think about this issue in another way.
Lucy, help me find all the papers about Riemann's hypothesis, filter out the valuable research results, and sort the final results. Jiang Cheng gave up meaningless thinking, turned his head and gave a new order to Lucy in midair.
If Jiang Cheng feels that he can't figure out a way, it's better to take a look at other researches.
Although none of the successful studies proved the Riemann hypothesis, some papers are still very valuable.
At least those papers can help Jiang Cheng eliminate some wrong answers and save him the time needed to find solutions.
Generally speaking, people who want to study this kind of mathematical problems need to understand all the previous research processes. This is the basic method of mathematical research.
Jiang Cheng is just doing very ordinary things now, at least for mathematicians.
Since Jiang Cheng wanted to see the success of the previous research, he simply found out all the papers on Riemann's hypothesis.
A look at the papers of predecessors will not cause any loss, maybe it can help Jiang Cheng find some inspiration.
But there are a lot of papers about Riemann's hypothesis. After hundreds of years of accumulation, countless mathematicians have studied this problem, and they probably left tens of thousands of papers.
It takes a long time to finish reading these papers, and not all of them are useful.
Some of these papers are completely wrong, which is of no use to Jiang Cheng.
So Jiang Cheng needs Lucy's help to help him filter out useful things. Lucy will naturally help him analyze which papers are helpful to him and which papers are just useless garbage.
In this way, Jiang Cheng can save a lot of unnecessary time and can put more energy on research.
Lucy's artificial intelligence is not only useful for helping him to conduct technical research, but also for Jiang Cheng in specializing in basic subjects.
It is indeed a top-level artificial intelligence, which can help Jiang Cheng in all fields.
After hearing Jiang Cheng's order, Lucy began to enter the state of calculation again.
Okay, master, I will help you search and filter. Please wait a moment and it will be fine soon. "