Chapter 278

Everyone is familiar with the name Gu Lu.

However, what surprised everyone was that Gu Lu was not a mathematician in the field of algebraic geometry. How could he appear here?

Did he go to the wrong venue?

That’s not right either!

The host just said that the name of the mathematician who will give the final ten-minute report is Gu Lu.

The ten-minute report needs to be applied for in advance.

If Gu Lu went to the wrong venue and took a conference report paper in the field of algebraic geometry, he would not be able to pass the review of the analytic number theory branch.

In other words, Gu Lu came prepared.

But no one has ever heard of Gu Lu’s achievements in the field of number theory!

Gu Lu now has three well-known mathematical achievements.

The solution to two major problems in the minimal model program, the proof of Bab's conjecture, and the formulation of the complex ring conjecture.

It can be said that these three achievements all belong to the field of algebraic geometry.

In terms of number theory, no one has heard of any major research results published by Gu Lu.

As a result, everyone did not have much expectations for Gu Lu to speak on stage this time.

It's just that he was extremely curious about Gu Lu's sudden arrival at their analytic number theory branch meeting.

As a result, many bored mathematicians were intrigued.

…………

Everyone's eyes searched for Gu Lu's figure in the conference room.

So, when Gu Lu stood up with that handsome face that will be unforgettable for a lifetime, he was quickly fixed on by everyone's eyes that were either curious or suspicious.

Gu Lu nodded and smiled at everyone.

Then, he ignored everyone's looks and walked straight to the stage.

The host began to introduce Gu Lu’s resume.

The difference from yesterday is that in the column of scientific research results, Gu Lu added a new result of 'Proposing the Complex Ring Conjecture'.

When the mathematicians below heard this, they also subconsciously glanced at Gu Lu on the stage.

Even though they are mathematicians in the field of number theory, everyone has heard about the 'complex ring conjecture'.

The mathematical value of the complex ring conjecture is extremely high, and it is highly praised by several older generation mathematicians in the geometry field.

If it weren't for their advanced age, they would even be willing to personally take charge of overcoming this conjecture.

It is said that this compound ring conjecture, which caused a great sensation in the geometric world, was proposed by the young man in front of me in his forty-five-minute report yesterday.

Faintly, Gu Lu showed signs of becoming one of the top five geniuses in the field of algebraic geometry.

And Gu Lu is only 24 years old this year!

But, still the same sentence.

In the field of algebraic geometry, Gu Lu has become the first person of the younger generation.

However, in the field of analytic number theory, Gu Lu is still a newbie in the eyes of everyone.

No one thought that Gu Lu would say anything grand in the next ten minutes.

"Maybe just come over here and brush your face."

This is what everyone thinks.

…………

"Now, the next ten minutes will be given to Mr. Gu Lu!"

After saying this, the host handed the microphone to Gu Lu and retreated from the stage.

Ahem...

Gu Lu coughed lightly and glanced at the audience.

Most of them are completely unfamiliar faces.

Since there was only ten minutes, which was too short, Gu Lu didn't say too many polite nonsense and went straight to the topic.

"Due to the rush of preparation this time, I didn't bring the ppt. However, what I want to talk about is not very complicated, so I will just use the blackboard to start the lecture."

After saying this, regardless of the reaction of the people below, Gu Lu picked up a marker and wrote six large characters on the blackboard behind him:

The whole point problem in the ball!

Seeing these six words, everyone below frowned slightly in confusion.

The problem of the whole point in the ball is a relatively well-known problem in the field of number theory, and everyone present will know it.

Can……

What does Gu Lu mean when he writes these six words?

Could it be said that... Gu Lu made a breakthrough on the issue of in-ball timing!

This is incredible!

You must know that since the 1990s, there has not been any major breakthrough progress in the field of in-ball point issues.

Research once hit a stagnant bottleneck.

It's just that I don't know where Gu Lu made a breakthrough on the whole point problem in the ball.

Is it the distribution of prime numbers or the three-dimensional divisor formula?

Some mathematicians began to become more serious and no longer looked down upon.

This Gu Lu seems to be well prepared!

…………

After writing those six words on the blackboard, Gu Lu knocked on the blackboard and started a ten-minute report.

"The topic of my report this time is the problem of integers in a sphere. What is the problem of integers in a sphere? You are all mathematicians in the field of analytic number theory, so I don't think you need too much explanation."

"Time is short, I will get straight to the point."

After speaking, Gu Lu wrote a series of formulas on the blackboard.

【 s(x):=∑(1≤1,2,≤x)d(12222)=8ζ()/5ζ(4)xlogxo(x)】

Seeing such a long list of formulas, many mathematicians are confused.

What the hell is this?!

I don’t see any connection between this formula and the problem of the whole point inside the ball.

What is this Gu Lu doing?

Many mathematicians are puzzled.

Of course, there were also a group of rational mathematicians who glanced at the line of formulas written by Gu Lu on the blackboard, looking thoughtful.

Who is Gu Lu?

Although they did not understand the connection between this line of formula and the problem of the whole point in the ball, they believed that since Gu Lu wrote this line of formula, it must not be without purpose.

This line of formula must have a profound meaning.

Without leaving everyone confused for too long, Gu Lu, who was standing on the stage, quickly gave everyone the answer.

I saw that Gu Lu transformed that formula slightly and derived it, forming the second formula.

【s(x)=21i1xlogx(1i22i1)xo(x(8/e)】

This formula finally gives everyone a familiar feeling.

But no one could remember where they had seen this formula.

Gu Lv didn't have time to wait for the mathematicians below to recall.

He was already very pressed for time.

It took ten minutes to deduce the formula for the problem of the whole point in the ball. It was a huge challenge for Gu Lu.

Gu Lu did not give everyone time to think and continued to deduce on the blackboard.

Formula 1: s(x):=∑(1≤1,2,≤x)d(12222)=8ζ()/5ζ(4)xlogxo(x)

Formula 2: s(x)=21i1xlogx(1i22i1)xo(x(8/e)

Formula 3: s(x)=……

At the beginning, Gu Lu could still write on the side.

But later, when Gu Lu discovered that the speed of understanding of others could not keep up with his speaking speed, Gu Lu directly gave up the explanation, and instead concentrated on deriving formulas and calculations on the blackboard.

Gu Lu's hand speed is very fast. After all, he has been practicing for many years as a single person.

Therefore, within a few minutes, most of the four blackboards were filled with dense formulas.

At this time, Gu Lu also came to the final steps of the derivation.
Chapter completed!