Qin Jingyu really didn't want his life.

Based on the tools of Professor Thomas, she finally determined the Siegel formula and used a sequence to enumerate all the prime numbers, because each term of the formula n(n+1)/2 and its preceding and following terms are superimposed. , but the premise depends on twin prime numbers, how to prove without doubt that there are infinitely many prime numbers that are twinned in this way.

Therefore, at this moment, she was extremely lucky to have proved the twin prime numbers in advance.

It's like they are intertwined. If she doesn't solve the twin prime numbers, even if she changes the algorithm to this point, she will still stagnate because of the twin prime numbers.

Well, it all makes sense! ! !

After drinking a large cup of strong tea, she continued to write that according to the prime number theorem, the density of prime numbers is about 1/lnx...

According to Euler's formula e^πi=-1, e^2πi=1, let the argument angle corresponding to the spiral arc length Sn be T, and the argument dimension be lnT.

ln(T/2π) is the dimension of the number of turns corresponding to the argument angle T, so the number of non-trivial real zero points given by Riemann is approximately T/2π(ln(T/2π)-1)) , it is found that the number of zero points = the number of turns in the dimension x (the number of composites in the same turn number dimension is distinguished according to the number of factors)!

Correspondingly, the number of prime numbers = the number of turns/the number of turns and the dimension = the number of turns/(the composite dimension + the prime number dimension).

Thus, a high-dimensional critical value is formed between the prime number and the composite number, which is iteratively differentiated according to the number of prime factors. The upper and lower bounds are represented by the complex number s=δ+ti.

This critical value is the trivial zero points of the z function and those non-trivial zero points involving the Riemann Hypothesis - countless real zero points of z(s)=1 on the straight line of Real(s)=2/0.

That is, all non-trivial zero points of the Riemann z function are located on the straight line Re(s)=1/2 on the complex plane...

Finally, the Riemann Hypothesis was proved and the conclusion was drawn that the Riemann Hypothesis was established! ! !

Qin Jingyu was so tired that his hand holding the pen trembled as he wrote down the last formula!

After accumulating nearly half a book on the manuscript paper in front of her, she sat at the desk, took off her glasses, and rubbed her tired eyes.

Summoning system: [886, have I proved the Riemann Hypothesis? 】

886: [Sorry host, the method you used is not included in the system calculation, and the system cannot give an accurate answer. Currently, it needs further confirmation as to whether the Riemann Hypothesis proved by the host using a modified algorithm is true. 】

Qin Jingyu frowned: [So you don’t approve of my algorithm? 】

886: [Sorry host, the Riemann Hypothesis is a huge conjecture. It has a wide impact, including artificial intelligence and our advanced systems. Whether your proof is valid or not, the system is currently unable to give an accurate answer. 】

Qin Jingyu: [You just said that my algorithm is different from your system algorithm. What do you mean? 】

886: [The system has fragment rewards related to the Riemann Hypothesis, which is inconsistent with the host’s algorithm. 】

She got it.

Her choice to change the algorithm was an eccentric approach. She had already considered that the SCI journal would not pass the review. At present, the system may not be able to pass the review without SCI.

She stared at the manuscript paper in front of her. Since she changed the algorithm, all her demonstration processes have gone smoothly and the formulas have been established, so she firmly believes that by changing the algorithm, the Riemann Hypothesis is established.

Just because she is inconsistent with the system algorithm does not mean that she is also wrong. Maybe there is more than one way to prove it, and she is another one.

Qin Jingyu: [886, I want to redeem the Riemann Hypothesis fragments. 】

886: [Host, are you sure you want to use the reward points to redeem Riemann Hypothesis fragments*3? 】

Qin Jingyu said firmly: [OK]

886: [The host has used its own algorithm to demonstrate the Riemann Hypothesis. Why not upload the paper and wait for the review of an international mathematics journal to prove whether it is true? 】

Qin Jingyu: [I don’t have any other ideas. I just want to see who is better than your system, the proof method that cannot be questioned, and my algorithm. 】

Her determination to win was never limited to her studies. Since the system questioned her own solution, she wanted to see how the system's solution differed from hers.

886: [Host, I like your drive. 】

[Confirmation for the last time, please ask the host if you want to redeem the Riemann Hypothesis fragments*3]

【confirm. 】

-

Qin Jingyu got the guessing solution fragments.

Fragment 1: Elliptic complex function

Fragment 2: Close connection between Zeta function and Gamma function

Fragment Three: Number Theory Prime Numbers

When she saw the three fragments, Qin Jingyu understood that although it was general, it gave a general direction. It was similar to what she and Heliancheng had studied at the beginning. The difference was that she found that it was a huge project. Later, I changed the route and used the algorithm, but the direction given by the system was to continue moving forward.

It also involves Cauchy's theorem integration and Fourier transform, but it is far less bold than her use. She used the harmonic screening method to change the algorithm from the beginning to eliminate falsehoods and preserve truths, while the system went through all the mud and sand until the end before selecting the argument with the highest probability.

Without taking a moment to rest, the second argument process began.

……

Lei Wujie originally didn't plan to care about Qin Jingyu, but he was afraid of his sudden death.

Delivering three meals a day was to ensure that Qin Jingyu was still alive. He really didn't understand why he was working so hard.

And hasn’t he already won the mathematics award from China? Isn’t that mathematics research important?

As for being so sleepless!

Lei Wujie couldn't understand it at all and could only respect it.

Lei Wujie has been learning cooking skills from Aunt Chen in the past two days and has improved a lot, but he doesn't dare to eat it for Qin Jingyu, fearing that if he doesn't die suddenly, he will be poisoned or die by his own food.

At the same time, Lei Wujie also saw the old man who got off the military vehicle that day at Aunt Chen's house.

He went to the Internet to check the identity of the other party. It turned out that he was Professor Jiang Yuantao that Qin Jingyu wanted to meet. Unfortunately, that person had not come downstairs for three or four days.

He didn't even have time to say a word to him. Every time he knocked on the door to deliver food, and then came back a while later to pick up the empty rice bowl outside the study.

Gu Huaiyu would come here once a day. Qin Jingyu didn't report to Zhonghai University for a day, so he had to wait.

The school, especially the principal, didn't wait for Qin Jingyu to report for a long time. It was out of scheming. He was afraid that he would run away and what if he was snatched away by another school?

If possible, Principal Lu would also like to visit him once a day and keep him under guard.

However, he learned from Gu Huaiyu that the young mathematician had been studying in seclusion recently, but he did not dare to disturb him rashly, so he had to ask Gu Huaiyu to go there every day.

Jiang Yuantao was also waiting for Qin Jingyu. He was delayed in the research institute for a while and hurried back, only to learn that Qin Jingyu had moved next door but stayed in the study. There was no light in the study on the second floor of the Xiaoyang Building at night. After it was extinguished, Jiang Yuantao knew that this young boy was probably holding back some big move.

So he waited quietly at home. Those people from the National Institute of Mathematical Sciences were willing to let Qin Jingyu come to Zhonghai University, even if they handed the person into his hands. If something happened, the old guys from the National Institute of Mathematical Sciences would not agree.

So every time Lei Wujie from next door came, he would ask Aunt Chen to make nutritious meals for him to take back.

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