Amaryllis Cornell University's Elementary Particle Physics Laboratory is one of the most famous particle accelerator physics research centers in the world.

They have a top-notch physics research team, and are very professional in the field of particle research, with many well-known top results.

After establishing the anti-gravity experimental group, determining the center of gravity, and communicating the nature and direction of the gravity field, the research of the experimental group has also become very popular.

"The phenomenon of reduced speed of light" is not the first discovery made by the antigravity experimental group of the Particle Physics Laboratory.

They had already made some discoveries before, but the impact was not that big when they were released.

The phenomenon of "lowering the speed of light" is of great concern because it violates conventional physical properties.

Normally, the reduction in the speed of light does not seem to be a major discovery, because light propagates at different speeds in different media.

For example, the speed of light in vacuum is 300,000 kilometers per second.

The speed of light in water is 225,000 kilometers per second.

The speed of light in glass is 200,000 kilometers per second.

However, Einstein's theory believes that the speed of light is constant, which seems to conflict with the above differences in the speed of light.

A constant speed of light means that the speed of light does not change depending on the reference system.

In fact, the moving speed of light in any propagation medium is constant. The final measured speed of light is different because the distance that light moves in different media changes.

When light propagates in glass and water, because there is a material environment, there will be a process in which photons are absorbed and then released, and ultimately the overall movement speed of the light is measured to slow down. In essence, it is not that the speed of light is slowing down.

Instead, the process of photon absorption and release creates a delay.

Because of this, the antigravity team of the Elementary Particle Physics Laboratory caused international heated discussion when they tested that the speed of light was reduced, because the environment they tested was a vacuum environment.

There is naturally no process of photons being absorbed and released in a vacuum environment.

However, the measurement result is that the speed of light has decreased, and the only factor that changed is the AC gravity field. It can be concluded that the AC gravity field directly caused the decrease in the speed of light.

So why does the AC gravity field cause the speed of light to decrease?

How does this effect occur?

This issue has aroused heated discussion in the international physics community. Every physicist knows very well that the reduction of the speed of light in the AC gravity field is definitely an astonishing discovery.

…

Wang Hao also knows that new discoveries are very important. Even the system prompts the research of annihilation theory, and the inspiration value has been improved.

He has thought about this to some extent.

The system of annihilation theory was created by Wang Hao. Naturally, he has a very good understanding of the annihilation force. In essence, the annihilation force is the expression of space extrusion.

Therefore, his understanding of the speed of light is that "an imperfect form composed of mass units advances at the highest speed under the influence of space squeeze, so as not to be "annihilated".

Considered from this perspective, the essence of an antigravity field is to create an area where "space compression is weakened".

"If you think of light as a particle, it is an imperfect microstructure."

"If you think of light as a wave, it is a lot of imperfect microstructures connected together. But no matter how you understand it, light will not be directly affected by the squeeze of space or interact with each other, so there is only energy.

, there is no quality."

Wang Hao had already found a research direction. He thought about it and found Lin Bohan and Belkar. Later, he also found Paul Phil-Jones and his students Xu Chao, Chen Mengmeng, and Helen.

"I have decided to organize a research team, and you can freely choose to participate or not."

"You should all already know that Cornell University's latest discovery is that the speed of light decreases in an AC gravity field environment."

"I will conduct research on this issue and have found the main direction."

"But we still need everyone to study, think, and discuss together..."

Wang Hao briefly explained that the main reason why he recruited so many people to study together is because it is easy to produce results when many people study together.

When everyone has the right idea, research will advance.

In addition, there is no confidentiality issue in theoretical research, and scholars who can be helpful to the research can participate.

As for the few students, Helen's level is enough to join the research group.

Chen Mengmeng is relatively poor, but from the perspective of training students, letting her participate will be of great help to her personally.

Xu Jie is completely incidental.

Wang Hao has half given up on Xu Jie. In the future, Xu Chao can choose Zhang Zhiqiang to do research on mathematics and computers when he is studying for a Ph.D. He is indeed not suitable for pure mathematics research.

After Wang Hao finished speaking, naturally no one would refuse to join the research team. They were all looking forward to the new research.

Then Wang Hao began to explain the content, "I have found the direction. Our work can be understood as studying the sandwich content of topology and semi-topology."

"This is a kind of pure mathematical research, which can also be understood as the research of physical theory."

"I hope to find a new special form."

"It is very meaningful to demonstrate waves and massless particles..."

Because he has already found the research direction, Wang Hao believes that the difficulty of the research is not high, but it only requires a certain amount of imagination.

If light is considered to be composed of particles, that is, photons, he believes that the shape of photons can be regarded as a "topological structure." The topological structure is very close to a dot, but it is not a pure dot.

If the topological structure is a round point, it can be understood that it is the same as the mass unit and can be directly annihilated.

"Close to a dot", naturally it is not a dot and cannot be annihilated.

But what kind of shape will be close to a dot without becoming a dot?

This is where imagination is required.

As long as you can imagine this form, no matter what the specific shape is before the topology, you can make targeted analysis and calculations.

…

Wang Hao spent a long time explaining the research direction.

People who participated in the research also couldn’t wait to get into work.

However, there was a problem with Birkar. He went to Wang Hao and said, "It is difficult for me to complete so much calculation and analysis by myself."

Birkar said, "I need a helper, preferably a scholar in the field of algebraic geometry, and the current job is not direct calculation, but also requires imagination... "

"That is, a young algebraic geometer, right?"

"That's right."

Wang Hao was thinking and immediately thought of a person, Zhang He, the leader of the computing team.

He found Zhang He and invited him to join the research team.

It was naturally impossible for Zhang He to refuse, or in other words, no mathematician could refuse to do research with Wang Hao.

at the same time.

On the campus of Capital University, Gao Zhenming and President Ye Qing were walking together. They had just attended the school's meeting, and Ye Qing was also concerned about the school's new academicians.

Ye Qing asked about Gao Zhenming's recent research work, "Nowadays, algebraic geometry is the field that attracts the most attention in mathematics. Academician Gao, you are the most well-known algebraic geometry expert in China. Have you considered researching in the direction of superconducting mechanisms?"

"

The superconducting mechanism, that is, the direction of semi-topological microscopic morphology, is the focus of academic circles.

After hearing this, Gao Zhenming's face suddenly turned bitter.

He had previously considered doing research in the direction of semi-topological micromorphology, that is, doing work on simplifying semi-topological theory.

As a result, just at the beginning, Wang Hao and Bill Carr jointly introduced a "weakened Hodge conjecture," directly linking semi-topology and algebraic geometry.

This also caused his research to lose its meaning.

Although the new results of Wang Hao and Birkar have not been confirmed internationally, most scholars believe that

no problem.

It is not easy for him to think about the direction now.

If it is still a superconducting mechanism, then he can only do research in the direction of microscopic morphology and calculation. As for the "semi-topological" simplification work, there is no way out.

"well……"

Gao Zhenming let out a long sigh and talked to Ye Qing with a wry smile.

Ye Qing consoled him, "Academician Gao, don't compare with Wang Hao. The semi-topological theory is originally their achievement. We can do research in this direction, but it is impossible to surpass them.

"

"I also know about weakening the Hodge conjecture. In fact, I think this research is very good."

"Perhaps you can do further work on the basis of weakening the Hodge conjecture?"

Gao Zhenming was stunned for a moment, "You mean, to study the Hodge conjecture?"

Ye Qing said, "It doesn't have to be Hodge's conjecture. It just needs further exploration in the field of algebraic geometry."

Gao Zhenming thought and nodded, feeling that what Ye Qing said made sense.

Although the expression problem of semi-topology has been solved, the connection between semi-topology and algebraic geometry that weakens the Hodge conjecture is based on which he can continue his research in the direction of algebraic geometry.

Even if you cannot complete the Hodge conjecture problem, continuing to do in-depth research and contacting topological expressions is a good direction.
To be continued...