Lin Xiao's young face.

Zhao Qi grinded his teeth, wondering why his teeth were sore?

Of course, putting aside the question of whether it is sour or not, Lin Xiao once again received an invitation to give a one-hour report, which is also a benefit to their college and school, although it is not as good as inviting many mathematicians from the world of mathematics to come and participate in an academic event.

The report greatly improves the international reputation, but the domestic reputation is still very good.

Although Peking University is already well-known in China, it will never dislike this opportunity to earn reputation. Just look at how much it helps them compete with Qinghua for students because of Lin Xiao.

.

So Zhao Qi forgot Lin Xiao's Versailles words and said with a smile: "Hey, let me congratulate Professor Lin first. If you plan to give a report at the International Congress of Mathematicians, that's okay. I fully support you.

.”

"Haha, it depends on the situation."

Lin Xiao waved his hand.

"Well, okay, that's it."

Zhao Qi nodded, and then they stopped talking and left Lin Xiao's office.

Lin Xiao tidied up and returned to Yan Beiyuan's house.

After stroking his breasts, he sat down at his desk.

Open his paper that proved Lin's conjecture and browse through it.

But when he looked at it, his eyes flickered slightly.

He had indeed planned to give a report on Lin's conjecture at the International Congress of Mathematicians.

However, when compiling the paper, he was surprised to find that the proof process and results seemed to be applicable to the study of Hodge's conjecture!

Even help prove the Hodge conjecture!

In the past, in order to prove Lin's conjecture, due to the connection between Lin's conjecture and Hodge's conjecture, he had read many papers studying the Hodge's conjecture. Now that Lin's conjecture has been proven, looking back

Let’s take another look at the relationship between Lin’s conjecture and Hodge’s conjecture, and it can even be deepened.

And this will also help prove the Hodge conjecture!

What is Hodge's conjecture?

One of the Seven Millennium Problems!

The seven major problems of each millennium are of great significance to the academic world.

The Riemann Hypothesis can crack the mystery of prime numbers; once the p=np problem is true, we may even be able to use computers to prove other millennium problems; the existence and smoothness of the solution to the Navier-Stokes equation will be able to crack all kinds of problems in the world.

The secret of fluid movement...

The Hodge conjecture can truly connect two seemingly unrelated fields of mathematics, algebraic geometry and topology, and once again make great progress in the unification of mathematics.

Although there is overlap between algebraic geometry and topology and can be used in each other's research, the two are not really connected.

Even Lin's conjecture only connects ordinary functions and layers, which makes the connection between algebra and geometry closer.

Lin Xiao thought in his mind, and finally shook his head and stopped thinking about it.

Although the Lin's theorem he proved was helpful in proving the Hodge conjecture, it is still quite difficult to truly prove the Hodge conjecture.

And he didn't have time to do it yet.

After all, what he wants to study now is an X-ray lithography machine.

Just like what he just told Zhao Qi and others, he proved Lin's conjecture for this purpose.

That is to conduct a more fundamental study of the formation mechanism of chemical bonds.

And now, he already has such an opportunity.

Reopen another document, this document is called "Electronic Topological Bonding Theory".

Over the past few days, he has not paid any attention to the outside discussion about Lin's conjecture, and has been devoting all his attention to the research of this theory.

Electronic topological bonding theory regards chemical bonds as ropes and atomic nuclei as kink. The topology between them is the principle of their bonding and formation of their own molecular structure!

This is the new theory that Lin Xiao will bring to the world again.

In fact, nearly two hundred years ago, a scholar named Kelvin already believed that kink could be used to study atoms. However, that scholar had not escaped the influence of the "ether theory", so in the end this research was still unsuccessful.

Let it go.

But now, Lin Xiao has to use a new way to understand it.

The corners of his mouth curled up slightly.

Proving Lin's conjecture has stirred up the turmoil in the mathematical world, and proposing the electronic topological bonding theory will stir up the turmoil in the three fields of condensed matter physics, structural chemistry, and materials!

Of course, he did not stop at fantasizing about success. After all, he has not succeeded yet.

Taking out his pen, he began to make his own calculations.

[Suppose an atom is a kink p, has m layers of electron orbits, and n electrons...Suppose there are X atoms of this atom in a crystal unit cell...]

[According to the basic bonding theory, the possibility of forming a chemical bond between these atoms is (mn/X)*(√nm/X)*...]

[...φ(x)=∫r∈K|dr|/|xr|=∫2π0|r′(t)|dt/|x?r(t)|]

…

It is quite difficult to use topology to understand such atomic level problems.

This is probably to give a rope of any length, and then twist it into a Rubik's cube, and it has to be 9*9, 18*18 is not impossible, if the unit cell is complex enough.

This first requires a strong spatial imagination.

However, with Lin Xiao's current brain development, he was able to establish a model of light diffraction and interference in his mind, and naturally he was able to establish such a model of kink in his mind.

So, first of all, he solved a major problem in studying this thing.

Then, it’s a game of math.

To study a problem is to drag the problem into the field in which you are good at solving it.

For Lin Xiao, mathematics is a field that he is good at, but this field is relatively versatile and can be used to solve too many other problems.

In this way, a new theory gradually came into being in his hands.

The academic community still has not realized that what kind of storm is hidden behind the charm that has just been faced with the proof of Lin's conjecture, which is about to set off its turbulence.

…
Chapter completed!