Scholar’s Advanced Technological System

November 25.

The heavy rains in North Rhine-West * * give rise to some concerns as to whether the water on the Rhine will cross the embankment.

Situated on the right bank of the Rhine, at this very moment in time, in a rugged research institute.

The grey black stone brick was filled with years of speckles and cried low in the baptism of the wind and rain, like an old man relying on a vine shelf, sighing lightly for days gone by.

And, of course, this weather is so bad that it seems insignificant compared to the things that really deserve it.

As a brilliant witness to the past of the Gottingen school and heir to the Brbaki school, it has been thinking about the world for almost two hundred years and will continue to do so unexpectedly.

But this is probably the first time.

Because of a problem, it bothers it so much...

The door opened and an elderly man walked in from outside the institute on a staircase full of water damage.

Shaking down the water bead on the raincoat, he handed it to his assistant, who had just arrived from his home, while Professor Faltines rubbed his hands in a white fog and walked in the direction of the conference room with a dusty servant.

It has been more than a month since we returned to Europe from China.

In more than a month, a lot has happened in mathematics.

Beginning with the paper published in Future Mathematics on Beilinson-Bloch's Proof of Thoughts, the study of motive in algebraic geometry, on homogeneous theory, went directly from shallow beaches near the coast to deep waters.

A large number of research findings have emerged in this field, and it is increasingly believed that Grotendik's prophecy for algebraic geometry is within reach and probability is correct.

Without too many accidents, happiness may last a lifetime, and the vast majority of people have hope to see that day.

The day when algebra and geometry are united in a sense!

“Long time no see, Professor Fartings.” Looking at Faltines walking in from outside the conference room, an elderly man who looked somewhat blessed, smiled on his face and enthusiastically extended his right hand to greet him.

“It's been six years since I last met you in the Blue Room in Stockholm. ”

“Don't worry, Sanak, you've finally arrived.” Hold his hand and shake it gently. Faltines swept his eyes. His belly was like a leather ball strapped by a rope, and his mouth couldn't help but tear it apart. "Looks like you've had a good life in recent years. ”

“It fits,” Sanak chuckled, “your humor is still so unpleasant. ”

Professor Sanak, former editor-in-chief of the Yearbook of Mathematics and winner of the 2014 Wolf Prize in Mathematics, is a scholar who can win this award for the nature of lifelong achievement, perhaps not the best in academia, but must be the one with global reputation.

As for why the former editor-in-chief of the Mathematical Yearbook appeared here...

Naturally, the reason is that, like Deligne, who sits at the table and flips over the minutes without a word, they are all sitting here for the same reason and for the same purpose.

This mathematical gathering brings together almost all of the top scholars from the Burbaki school.

Including him, Sanak, including Grotendik's proudest mentor, Deligne, and the first man to be known as the mathematical pope, Fartings, and Schultz, a young scholar recognized by Fartings as the most promising to surpass him…

So far, the meeting has lasted three full days.

“Now that everyone is here, we can go straight to today's theme,” Faltines said slowly as he sat down trembling at the conference table, watching the heavy rain pouring out of his window. "It's going to be winter in a few days. It's really hard to sit together for a meeting like this. ”

“I agree with you," finally finished reading the minutes of the meeting in hand, Professor Deligne pushed the old glasses on the nose beam and said in a steady voice, "I can hardly stand the point in Europe, it rains constantly every year at this time, my coat does not dry for a day. ”

The proposal by Faltins was unanimously endorsed by more than a dozen participants.

The seminar session, which featured the doctrine of general unification, quickly opened the curtain.

The first speaker was Schultz, who reported on his study of morphometric emission Hom (hX, hY) on the smooth emission cluster k over the course of the month, defining it as a non-Abel category.

As soon as this view was expressed, it was of great concern to all participants.

It is well known that the Abel category is the basic framework for homogeneous algebra, and if the morphological emission of smooth emission shadow clusters on k is not in the Abel category, they undoubtedly deny that they ever guessed the most likely way to solve the general unification theory - that is, through the upward homogeneous and algebraic topology.

Such an outcome, while somewhat frustrating, can prove that a thought is not feasible and saves us a lot of valuable time.

At least now they don't have to assume the possibilities of Hom (hX, hY) while discussing an uncertain proposition on uncertain probabilities.

The meeting lasted an entire two hours.

Virtually all of us put the results of our research over the past month on the table for discussion until the end of the session.

Looking at a line of grassy notes on the notebook, Faltines lightened his head with satisfaction.

Compared to yesterday, some progress has been made today.

In addition to demonstrating that studying morphological emission of smooth emission clusters on k using the method of homogenization and algebraic topology is a waste of time, through algebraic chain theory, they succeeded in deriving the range of smooth emission clusters on k as V (k), validating one of Grotendic's assumptions about standard speculation.

This exciting result alone is enough for them to open at least one bottle of champagne.

It is not just a gradual outcome of the great unification doctrine.

This is also a gradual outcome of the presumption of evidentiary standards.

Now, instead of being champagne-free, and not even optimistic about it, there is a growing sense of urgency in our minds.

Algebra chain theory is not a particularly complex approach, and Faltines believes that if they could come up with it, that person would want it.

He hasn't published a paper in over a month.

This either indicates that he is caught in a bottleneck or that he is brewing something more amazing.

Fartings is more inclined to believe that the latter is more likely.

After more than a month of strenuous progress, he is no longer expected to solve this proposition by himself or Schultz.

There may be some privacy in it, but it's definitely not for yourself.

He now expects only to be able to muster the strength of the entire Brbaki school to overcome this dilemma and to allow the school's glory to continue, not to be obscured by the light emanating from a brighter lighthouse.

If that person really completes the unified theory...

Unlike Lehman's assumption that thousands to thousands of propositions will rise to the theorem, the theory of grand unification will put thousands of theorems in a straight line.

This result will even exceed the sum of all mathematical achievements of the twentieth century.

And he who has accomplished this great work will undoubtedly reach the peak of history...

The meeting was concluded.

The participants rose and left.

The notebook was stashed away, and just as Professor Fartings was about to get up, he suddenly noticed a smartphone on the table, and the screen flashed and a line of unread mail alerts popped up.

The index finger lit up on the screen, picking up his phone, and he was about to take a look at who sent the email.

But the moment he touched the mail, he was stunned.

The text is short.

It's as short as six letters.

Finish.