This is also the key to proving the Supersymtry Problem.
As long as the energy structure of fermions and bosons is established, the subsequent task is to analyze the structure mathematically and physically from a ’symtrical perspective’.
...
The energy structure of fermions and bosons is the core of proving the Supersymtry Problem.
Zhao Yi spent an hour and a half analyzing the energy structure of fermions and bosons, and filled in the initial energy point positions with theoretical mathematical values.
The next step was to summarize the marginal energy structure in the form of mathematical equations and functions.
Then, make comparisons.
The proof was almost done up to this point.
Through the comparison of mathematical proofs, it was already possible to see the shadows of the theoretical symtry of the two, and conclusions could be drawn with a detailed analysis.
Many people were already prepared to applaud.
However, Zhao Yi’s proof didn’t end there. He still had a core content to talk about, that is, to calculate and analyze the overall mathematical structure, to confirm that fermions and bosons originally had symtry at their formation.
This part could be understood through a simple mathematical example.
For example, take the number 0 as the point of symtry.
What is the symtry between the two sets of data with numbers -7, -4, -2, 1, 2, 3, 5 and -17, 3, 4, 5, and 7?
If the two sets of numbers are sumd up, it is easy to conclude: the sum of the first set of numbers is -2, and the sum of the second set is 2.
The mathematical structure of particle formation was much more complex.
Once Zhao Yi had completed the energy structure of fermions and bosons, he began to prove the overall mathematical structure. Many people did not know what he was going to say, as this part of the content was located at the end of the paper; it seed to be sowhat ’additional content’.
When people discovered that Zhao Yi was analyzing the initial symtric state of particles with a well-constructed energy system, many of them were surprised with their mouths wide open.
"Let’s look..."
"The fermion’s quantum spin is half odd, and the trend is presenting the γ (t, n) function, the curve initially ford is..."
"On the contrary, bosons are quite different, the energy distribution curve shows ... the curve initially ford is..."
"Within the custom range, energy is stated in the unit of points, and it presents a symtrical combination. I call it the positive and anti-energy form, comprehending several function correspondences..."
"When they were initially ford, due to the different comprehensive energies, it would form a fixed spin difference..."
"Therefore..."
Zhao Yi continued to explain.
The venue was quiet.
Those who could understand now knew what Zhao Yi was saying. Even those who couldn’t completely comprehend were following his logic and contemplating. Many people looked surprised, as if it was their first ti knowing that the Supersymtry Problem had co this far.
Sheldon Glashow was the sa.
From the beginning of the academic report up to now, he had an aloof, cold deanor, simply watching the stage with a mocking look. Now his countenance had beco much more serious and his brows furrowed.
If the Supersymtry Problem was argued only through the math of particle energy structure, it could be claid to be the mathematical logic of the Supersymtry Problem constructed by a person’s logic. But the addition of the overall structure analysis makes it different, which ans that the mathematical frawork of the structure has logically ford a closed loop, making it impossible for anyone to refute.
Do you say that the energy theory structure Supersymtry proof is fictional?
But why is it such a coincidence that while presuming symtry, it also allows the whole to analyze and present symtry?
This is like getting a bunch of goods, soone cos along and each good is priced, no one knows if the prices he marked are correct, but they all agree with the mass market price positioning, whether it is completely accurate or not?
Finally, when the prices of all the goods are added together, it’s surprising to find out that the total is the sa as the total price when all the goods were purchased.
Isn’t that surprising?
Isn’t that a coincidence?
Who would dare to say that soone is marking prices randomly?
For a mont, Sheldon Glashow was sowhat flustered. He couldn’t accept a brand new, fabricated ’fraud’ theory, but sohow the ’fraud’ theory’s logic ford an irrefutable closed loop. All the points he had thought of were sealed, and all his preparations were in vain.
His brows were tightly furrowed.
"Impossible!"
"Such a fraud theory cannot be so perfect! It’s impossible, there must be sothing wrong sowhere!"
"There must be!"
Sheldon Glashow listened more carefully, convinced of his judgnt that there must be so problem he hadn’t considered yet.
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