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Chapter 582 Crammel guessed, not just take it easy?

In fact…

Even the staff can guess what Jiang Nan is going to do, but some acquaintances below can even more.

For example, Lu Chengzhou, Miles, Pierre and Ligumas, even Kenyony realized it.

“he……”

“Could it be that he…”

“Is he really going to do that again?”

“You know this is the International Conference of Mathematicians! It’s a one-hour report meeting with thousands of people under the stage. Is he going to have another mathematical miracle in public?”

“Then this time, what do you want to prove?”

“Which conjecture? Which problem?”

“If it is a general conventional conjecture, it shouldn’t be possible for him to prove the first three conjectures anymore, right?”

“After all, he has already had six guesses per person, and just proved Hodge’s conjecture the day before yesterday.”

“Even if he is smart and evil, but he is only nineteen years old after all, so where does he have so much time to think?”

“…”

Big guys like Lu Chengzhou, Miles, Pierre, Ligumas, and Kennin all looked at each other for a while, including Will, who was hidden in the crowd.

These people are most familiar with Jiang Nan, and naturally understand why Jiang Nan is looking for a blackboard for the staff.

After all, this is not the first time.

It happened just once the day before yesterday, and it’s still vivid.

Oh!

correct!

Behind Pierre, there was some pretty white chick, Emma Christine.

The woman couldn’t help trembling even more, she didn’t know if she was afraid, excited, excited, and expectant.

It is worth mentioning.

It was popularized as early as Chapter 383.

Although there is no specific measurement standard between mathematical conjecture and conjecture, there are also levels.

This division is based on a comprehensive consideration of the difficulty and academic value of the conjecture itself and other factors.

The first class is the seven major mathematics problems of the millennium, including Riemann’s conjecture, Hodge’s conjecture, NP-complete problems, Poincaré conjecture, Yang-Mills existence and quality gap, Navigator-Stork equation and BSD guess.

Once any one of the above seven conjectures is proved.

That can not only promote the development of mathematics, but also affect all areas of the scientific community.

For example, the Riemann hypothesis involves the establishment or failure of more than a thousand propositions, and then radiates other disciplines.

Although there are not so many propositions involved in Hodge’s conjecture, its importance in algebraic geometry is self-evident.

The same is true for other remaining conjectures.

As for the second class, the three major mathematical problems in modern times in the world, Fermat’s Last Theorem, Goldbach’s Theorem and the Four-Color Theorem are also the three most famous problems.

Besides.

The Langlands Program and Hilbert’s 23 Questions are the topics, which can also be classified as second-class.

The third class often refers to the twin prime conjecture, Abc conjecture, Kolas conjecture, Zhou’s conjecture, Artin conjecture, Kramer conjecture, Hardy-Littlewood second conjecture, six-space theory, and hail conjecture, etc.

The above are all very global problems.

Prove any one.

That’s very close to the Third Prize in Mathematics.

Even as long as there are no special changes, the Wolf Prize in Mathematics and the Abel Prize can be won with high probability.

As for the Fields Award, it must be no more than forty years old. As long as the conditions are met, the problem is not big.

For example, Jiang Nan won this award easily, and by the way, he won the Gauss Award and the Chern Award together.

The division of the first three classes is relatively clear.

But in the fourth class, it’s not very clear.

Basically, they are all sub-problems of the previous third-class conjectures, or weak conjectures, or part of the analysis.

At the fifth level, it is even more ambiguous, and almost all kinds of unpopular problems can be stuffed in.

Since the development of mathematics, many conjectures have been proposed. Any conjecture problem that does not reach the fourth class but has a certain value can be classified into the fifth class.

Give a simple example.

Some time ago, under the guidance of Jiang Nan, Wei Shen Yanbei solved the Hamilton-Tian conjecture and the zero-order estimation conjecture through the convergence of the Rich Flow.

The above two conjectures can be divided into the fifth class. Although they are not as good as the fourth class, they are also very important.

The subsequent conjectures are of little research value, but I feel a pity if I don’t understand it, just like a chicken rib.

But this is not the point…

The point is…

After Jiang Nan proved two first-class conjectures, one second-class conjecture, and three third-class conjectures.

Are you ready to prove the seventh conjecture in public in the one-hour report of the International Congress of Mathematicians?

this……

Are people capable of doing it?

If Jiang Nan proves the conventional conjecture of the fifth and sixth class, it will be fine, and it is barely acceptable.

But if Jiang Nan proves that it is the fourth class and above, then their little heart really has some unbearable rhythm.

And the next second.

Many people present had their eyes wide open, their mouths wide open, and their chins were about to fall to the ground, and they felt suffocated.

Just because…

Jiang Nan lifted his pen to the top of the blackboard and wrote nine characters of “Proof of Kramer’s Conjecture”.

“What?”

“Kramel’s guess?”

“He actually wants to prove Kramer’s conjecture?”

“This is so special, is he going crazy?”

“Although Kramer is not a first- and second-class conjecture, it is also a very famous third-class conjecture!”

“It has been more than eighty years since it was proposed, and I haven’t found any thoughts to crack, and he actually wants to…”

One of them counted as one, and nearly three thousand people in total, almost all of them were frightened by Jiang Nan’s crazy behavior.

Gee!

What a third-class conjecture!

Jiang Nan has already proved three, but now he has to prove the fourth. Is it true that the third-class guess is that Chinese cabbage is not successful?

They all feel that either the world is crazy, or they are crazy, or Jiang Nan is crazy.

It is well known that cats and mice are natural enemies, and who has ever seen a mouse be a bridesmaid for a cat?

But today, maybe you can see it.

For example, Will, the white man sitting in a corner, stood up for the first time, staring at Jiang Nan’s back on the stage, his eyes hot, he was surprised, nervous and expectant.

Although Jiang Nan wanted to prove the Seventh Avenue conjecture in public, Will, the white man, felt unbelievable.

But from the point of view of a mathematician, he hopes that Jiang Nan can once again create miracles.

Can Jiang Nan perform miracles?

The answer is naturally…

can!

And it must be possible!

Isn’t it just a small Kramer’s conjecture, to solve it, isn’t it a matter of minutes?

There may be many people who are very unfamiliar with this conjecture, after all, they are not mentioned many times before.

Some conferences even say that this writing is very abrupt and blunt, and it feels like pretending to be forced.

After all, Jiang Nan had never studied this conjecture before, so why did he suddenly prove it in public at the conference?

Actually…

This is really not pretending to be forceful.

And it’s really not too abrupt.

But foreshadowing earlier.

Also mentioned in Chapter 383, the twin prime conjecture and the Mersenne prime conjecture, the ABC conjecture, the Goldbach conjecture, and the Riemann conjecture are called the top five conjectures in terms of prime numbers.

Among them, Zhou’s conjecture is a conjecture on the distribution of Mersenne prime numbers, which can be equivalent.

And what does Kramer guess?

Everyone must have heard of this, right? ? ?

It was proposed in 1937 by the mathematician Harald Kramer of the Kingdom of Watches.

“This conjecture says: limsup(n to ∞) {p(n+1)-pn}/(lnpn)^2=1.

Here pn represents the nth prime number. ”

Everyone is right.

The conjecture is so simple.

It’s nothing more than such a small formula.

If you still don’t understand, then capture one important point. This conjecture is for prime numbers.

And prime numbers…

Isn’t that what Jiang Nan is good at?

For others.

Krammel’s conjecture may be difficult, and it is not an exaggeration to describe it as difficult to prove it.

Because as early as when Krammel proposed, he wanted to use the Riemann hypothesis to prove the conjecture.

But at that time Riemann’s hypothesis had not yet been proven.

Therefore, it can only be used to prove Kramer’s conjecture as a joke.

But now?

The Riemann hypothesis has been proved by Jiang Nan!

In addition, Goldbach, Twin Prime, Zhou Guai and ABC are all conjectures about prime numbers.

Gee!

After finishing several big conjectures, isn’t it just a matter of getting the Kramer’s conjecture?