The new paper Zhao Yi published in "Mathematical Progress" had a greater influence than his two papers from last month.
This influence was mainly within the academic community.
The publication of the first two papers last month caused a heated debate in the dia, but the focus of the general public was that he had published two papers in a row in top-ranking math journals, rather than what specific content the papers contained.
The third paper now served to elevate his influence in the field of mathematics.
Another one published consecutively.
For most mathematicians, being able to publish papers in the top four math journals is already an achievent worthy of boast.
But for Zhao Yi, the platform of publication is not important, the content is more so.
Regardless of where his papers are published, they will get accepted and published, and it only depends on the speed of the publication platform.
This paper, based on his previous paper asserting that a three-dinsional tremor waveform graph has more twin pri solutions, and assuming the establishnt of the three-dinsional tremor waveform graph, proved the existence of infinitely many twin pris, thus affirming the Twin Pris Conjecture.
So far.
The three-dinsional tremor waveform graph has been linked to the Riemann Conjecture and the Twin Pris Conjecture, thus becoming the most valuable research topic in mathematics.
The properties of the three-dinsional tremor waveform graph are truly appealing.
The graph has two sets of pri solutions proven in different ways, and the combined two sets of pri solutions are sohow tied to twin pris, surpassing the Riemann Conjecture in its research value.
It is certain that there will be countless mathematicians worldwide devoted to the research of the three-dinsional tremor waveform graph in the future.
This is influence.
Dostic academic dia have already defined the three-dinsional tremor waveform graph as ’Zhao’s Function’.
"This is a function created by Zhao Yi, yet it possesses amazing properties and holds high research value."
"So say that by fully understanding the three-dinsional tremor waveform graph, one might unlock the secrets of pri numbers, while others theorize that the mystery of the three-dinsional tremor waveform graph lies in revealing fundantal secrets of the universe, such as the string theory."
"Regardless of the viewpoint, one cannot deny the significant research value of the three-dinsional tremor waveform graph, and according to international nonclature rules, we can na the three-dinsional tremor waveform graph as ’Zhao’s Function’."
"The ergence of ’Zhao’s Function’ indicates the improvent of the mathematical level of our country..."
Zhao Yi found this reporting interesting, wondering how he should na the important function if he created another one in the future.
"The Second Zhao’s Function?"
"Zhao’s Function II?"
"Zhao’s Function Two?"
Zhao Yi thought as he faced the journalist who ca to interview him. The journalist was from the magazine under the dostic mathematics association. He took academic dia seriously as they differed from entertainnt dia or news dia in only reporting on academic fields, and the questions they asked were professional.
The journalist’s question went straight to the core concerns of the academic community, "Do you think that researching Zhao’s Function gives hope of solving the Twin Pris Conjecture?"
In other words, he was directly asking Zhao Yi whether the three-dinsional tremor waveform graph contained the secret to proving the Twin Pris Conjecture.
Of course, it did not.
Zhao Yi shook his head, "The waveform graph itself is conjectural, so it is unrealistic to prove the Twin Pris Conjecture with this."
"We can clarify the relationship - from Riemann Conjecture to waveform graph to Twin Pris Conjecture. If we could prove the Riemann Conjecture, we could then prove the Twin Pris Conjecture."
"But the world of mathematics recognizes that the Riemann Conjecture is more difficult to prove. Things often don’t work out as planned, but this is research. The waveform graph holds high research value, but the most fundantal and important is still the Riemann Conjecture."
The reporter was surprised by Zhao Yi’s statent.
The three-dinsional tremor waveform graph’s importance had already been widely reported in dostic and international dia, and the waveform graph was Zhao Yi’s personal work.
If there were relevant laws, he could even apply for a patent.
For things marked with one’s own label, the more important, the better. If it were anyone else, they would want to make the waveform graph as important as possible, but Zhao Yi insisted that proving the Riemann Conjecture was the most fundantal task.
"He’s still young after all!"
"Not knowing how to utter those hypocritical words of self-praise."
The reporter continued to ask, "Why are you so sure about your own statent?" He hoped to get a conclusion that even Zhao Yi was uncertain about, which would imply the waveform graph to be full of mystery and, coming from the creator of the function himself, implying it held higher research value.
This was intended to deliberately highlight the importance of Zhao Yi’s research.
It can be said that Zhao Yi is now a national treasure in China’s mathematics field. He is not only a benchmark for the younger generation, but even among the older generation, there are very few who can compare.
If we are only talking about the importance and influence of research results, no Chinese mathematician can compare.
This is a tragic situation.
When talking about influential figures in China’s mathematics, almost all of them are Chinese, or more specifically, people of Chinese descent with foreign citizenship. Whether they are still considered Chinese after acquiring foreign citizenship is debatable.
Zhao Yi replied with a slight smile, "I can be so sure because I have conducted extensive research on the waveform graph. In fact, I have yet to publish a research result about the Twin Pris Conjecture, excluding the part related to the waveform graph, which provides a definite proof."
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