The super scholar system becomes a scholar in one second

Chapter 663 Proof by Contrast

"President, just give him 10 minutes. We also really want to know how to prove the Riemann conjecture." Before Klaus refused, someone in the venue said jokingly.

Yes.

The Riemann Hypothesis is a boulder lying in front of the mathematics world, and countless people want to break it, but they know that no one can do it now.

They would like to see how Haruki can prove it.

"Okay! Professor Haruki, I'll give you 10 minutes." Gritting his teeth, Klaus said.

"Thank you, President." Hearing what Klaus said, Haruki immediately thanked him, and then waved to the assistant beside him.

Soon a whiteboard was sent to Haruki.

Emmmm, he is imitating the example, want to prove it on the spot?
Seeing the scene in front of him, the corners of Qin Luo's mouth twitched wildly.

Proving Riemann's conjecture on the spot within 10 minutes, something even he didn't dare to think about, but Haruki thought of it.

To this, Qin Luo can only say one thing, awesome!
Under everyone's shocked gaze, Haruki picked up a black marker pen and began to write on the whiteboard.

First of all, we still start from the infinite series, assuming that Re(s)>1:

m(s)={n=1}^{2m}+{1}{n^s}...

So assuming s0 is a zero point of Sm(s), then it must also be a zero point of βm(s), α(s)...

Looking at the series of calculations on the whiteboard, everyone's eyes gradually narrowed.

"Proof by contradiction!"

"Proof by contradiction!"

Almost at the same time, the voices of Qin Luo and Schultz sounded in the venue at the same time.

Yes, the method used by Haruki to prove the Riemann Hypothesis is a commonly used method in mathematics, the method of proof by contradiction.

He presupposes that the Riemann Hypothesis is established in advance, and then through the zero-point theory, he proves step by step that the Riemann Hypothesis constitutes other conditions of the Riemann Hypothesis.

Speculation, no, it should be said to be a trick.

Of course, Haruki's proof is not without dry goods.

His proof is based on the work of von Leumann and Friedrich Hitzerbruch, which to some extent puts a coat on his proof process.

Soon a whiteboard was filled with writing, and the proof process came to an end.

"Therefore, from the characteristics of the function itself, we know that the zero point s in the critical band must have R(s) = 1/2, that is, the Riemann conjecture is proved."

After writing the last string, Haruki slowly put down the signature pen in his hand, glanced around coldly, and said in a cold tone: "Riemann's conjecture has been proved, and thousands of more entries have been added overnight in the mathematics world." theorem."

At this moment, the whole place was silent.

Some big cows in the mathematics world also lost their voices.

They stared at the whiteboard with wide eyes, checking every step word by word.

It's smooth, and there's nothing logically impossible.

But I don't know why they always have a strange feeling in their hearts.

They think that he is right in the process of solving the problem.

But it was wrong, and they couldn't tell.

"Professor Qin, is it you or me?" At this moment, Peter Schultz's voice sounded in the venue.

Immediately afterwards, Qin Luo's voice also appeared in everyone's ears.

"Come on." Qin Luo said with a smile.

Schultz nodded and stood up slowly.

Just when everyone was puzzled, Schultz said: "It is undeniable that Professor Haruki's proof process is very smooth and the logic is very clear, but everyone always finds it very strange, right?"

(End of this chapter)