No one seed to understand.
Even the delegation from the Science Academy including Liu Hemin, didn’t understand why Zhao Yi insisted on performing an analysis of the solution of the 3D seismic waveform.
Wiles even burst into laughter. Seated in the front row conspicuous position, even those sitting next to him were smiling.
The short white man seated in the back row who had given up his seat to Wiles, leaned in and flatteringly muttered, "Mr. Wiles has just given a presentation on his analysis, could he possibly have sothing new to add?"
The tone of his voice made it clear that the answer was ’no’.
Wiles looked at him approvingly and generously said, "Well, I am rather looking forward to what he has to say. You mustn’t underestimate him, you know, he was the one who derived that 3D seismic waveform."
The short white man imdiately flattered him, "Respecting opponents. Mr. Wiles, you’re truly a gentleman!"
On the stage.
Zhao Yi smiled at the crowd, seemingly unaffected. He gestured for the audience to quieten down and then began, "I was intending to start with the derivation of the quintic equation or rather the Galois theory, but since Wiles has already addressed that, I won’t repeat."
"So we know the formula..."
Zhao Yi chalked a complex formula onto the blackboard.
Everyone understood.
That formula had been derived by Wiles after a careful and lengthy analysis.
But...
Why would he write a formula that was derived by Wiles?
Amidst all the confusion, Zhao Yi began to explain the formula. He talked about discriminants of polynomial equations, then moved to the Cardan Formula, and finally addressed the modularity of the Frey equation.
The modularity issue of the Frey equation was the core of Wiles’ proof of Fermat’s Last Theorem. It created a close link between the Gushan Shimura Conjecture and Fermat’s Last Theorem.
In Wiles’ paper on Fermat’s Last Theorem, a series of logical discussions were carried out around the modularity of the Frey equation.
Zhao Yi also launched a series of discussions around the modularity issue of Frey’s equation. The content he spoke about made everyone’s head spin, as most of the audience could not keep up, but Wiles and other elite mathematicians who have researched Wiles’ proof of Fermat’s Last Theorem understood that what he was saying was actually part of Wiles’ proof.
In essence, he was repeating the contents of Wiles’ paper.
After explaining his continuous theories, Zhao Yi chalked another strange equation onto the blackboard. The equation contained the symbols for ’greater than’ and ’equal to’, and it was so long that it was headache-inducing to look at.
He began a detailed analysis of the equation and concluded by saying, "Simply put, this equation is an ’anti-Wiles logic’ equation."
He had just ntioned the key words ’anti-Wiles logic’.
"Hoo-la~"
The auditorium was filled with noise once again.
Zhao Yi gestured for quiet before continuing, "Of course, I am not targeting Mr. Wiles. In fact, I believe that he is one of the greatest mathematicians in the world, and everything I just said is content from Mr. Wiles’ paper on the proof of Fermat’s Last Theorem."
He gestured towards Wiles.
Wiles had no choice but to rise and acknowledge that the content was indeed his paper.
"The equation on the blackboard now is derived from anti-Wiles logic. Let’s analyze it..."
"On the left..."
"On the right..."
Zhao Yi went on to explain a great deal of details, which were painstaking and most of the equation was not complex, the most puzzling part was the logical relationship between several symbols.
Once you understand the logical relationship, you can almost understand it.
This ’anti-Wiles logic’ equation ant that if Wiles Conjecture’s proof was correct, this equation was incorrect.
Otherwise,
Wiles didn’t even have to listen to the analysis to understand what Zhao Yi ant, he suddenly had an ominous premonition.
So top mathematicians also understood and watched with great interest. They were sure that the young Chinese man on the stage had a purpose in devising this ’anti-Wiles logic’ equation.
So, what was his purpose?
After completing his brain-racking explanation, Zhao Yi’s topic finally returned to the ’Three-Dinsional Seismic Form’ and he began discussing the problem of solving the form.
His perspective was different from that of Wiles.
Wiles was arguing for a simple solution, while Zhao Yi talked first about the wave form property, and then combined the Riemann Conjecture, the elliptic curve function, and other content to make a series of statents.
In the end, he got another formula.
The formula seed complicated and strange, but this odd equation combined with the Riemann Conjecture and the previous ’anti-Wiles logic equation’, led to a rather startling result.
A newly erged pri number solution set?
Those in the audience who understood suddenly widened their eyes.
Indeed!
At that mont, Zhao Yi said, "So, we can deduce that the wave pattern will never coincide with any section and the plane with x=1, y=1 planes. anwhile, the intersection points of the wave pattern and the plane with x=1, y=1, the solution is all pri numbers."
He finished in one breath, his hands resting on the table, and a peaceful smile on his face.
The stage below was silent.
Many people hadn’t yet grasped what Zhao Yi’s conclusion ant, but so had already understood that Zhao Yi had found another pri solution set for the ’Three-Dinsional Seismic Form’.
Both sets are related to the plane with x=1, y=1 defined.
One was the peaks and troughs.
The other was the intersection with the plane.
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