363: C363 Princeton's Shock

C363 Princeton's Shock

"It's probably that person who wants to make a fuss." Thinking of this, Deligne shook his head and was about to put down the tablet.

But in the next second, his wrist stopped. A person appeared at the corner of his eye.

He had just seen this name not too long ago, and the other party had consecutively proven Zhou's conjecture as well as his theory of twin primes!

"Interesting young man." Deligne smiled, braced himself and began to slide the board.

However, in the next second, Deligne was stunned.

What did he see?

4 map of different shapes, they are labeled successively, ABCD.

Below the figure is Qin Luo's reasonable deduction,

"1. If D cannot be adjacent to ABC at the same time, then the number of colors does not increase. If D cannot be adjacent to C, then DC will adopt a single color..."

"2. If D is contiguous with ABC at the same time, then D must be at the center or periphery of the ABC adjacent graph on the plane..."

"Sifting Technique!" Deligne smiled faintly.

As an experienced mathematics professor at Princeton University, he only needed a glance to see the method Qin Luo used.

However, there were many people who could use the sieve method to verify their four-colored conjectures, but not even one of them succeeded.

Deligne smiled and shook his head. "Yet another stubborn young lad."

"What?" Hearing Deligne's words, Henrik, who was beside him, came over.

"There's a guy from China who wants to use sifting methods to prove his four-color conjecture." Deligne said with a smile.

Sifting method?

Henrik smiled and said, "Another young man who doesn't know his place."

"Right, who is he?"

"Qin Luo."

Qin Luo?

Hearing Qin Luo's name, Henrik was stunned for a moment. A hint of doubt flashed between his brows as he muttered, "What a familiar name."

"The young man who proved Zhou's conjecture and the twin primes."

"So it's him!" Henrik suddenly realized what was going on and a light flashed in his eyes.

"Then I have to take a good look."

As he spoke, Henrik's head came up.

At this moment, they widened their eyes. For a long time, they couldn't move their eyes away.

"omg, how is this possible?" Henrik couldn't help but exclaim.

What was going on?

Hearing Henrik's call, the blonde Fariens asked.

"What's going on?"2

"Fariens, you came at the right time. Quick, take a look at this paper. Someone is using a sifting method to prove our four-color conjecture." Henrik waved at Fariens and said in a clear voice.

"Four color conjecture argument?" Fariens raised his eyebrows and a sharp light flashed across his eyes.

He would like to see what was so special about papers that surprised Henrik.

Fariens watched every word carefully.

After a few minutes, the surprise on Fariens's face became even more obvious. It was the first time he saw someone using the screening method so skillfully.

"When D is in the adjacent center of A, B, and C, d is surrounded by a, b, and c, and D region is significantly increased. From this point of view, the four-color theorem should be "3 + 1" color. This 1 is represented as the color that can be used again, that is, in the four colors, when it extends outwards, there is a color that can be used again, that is, this "1" color. "

"According to the above deduction, the four-color theory is thus established."

"Smack!"

The flat piece landed on the ground and the screen instantly shattered into pieces.

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