Background: The twin prime conjecture is a classic number theory puzzle and one of the most well-known conjectures that has always baffled us. At the International Congress of Mathematicians in 1900, mathematician David Hilbert offered 23 significant mathematical problems and conjectures to be solved. In the ninth of 23 mathematical questions, he includes the Bernhard Riemann conjecture, the Twin Prime Conjecture, and the Goldbach's conjecture.
Methods: The infinite set of infinite prime numbers is
divided, the increment equation of infinite prime numbers is established, and
the tree-like set of prime numbers is obtained using the "Differential
Incremental Equilibrium Theory" [1]. Find the twin primes with the least
amount of unit [1→1] of 2.
There are infinitely many prime numbers when a collection of prime numbers is
infinitely divided 2[1→1] pairs of prime numbers with a gap of 2 and a gap of
less than 2. The twin prime conjecture is completely proved by us. In the twin
prime conjecture, it demonstrates the importance of "Differential
Incremental Equilibrium Theory" [1] and infinite categorization. The set
infinite partition classification verifies that the minimum unit is two at a
higher level of ideology. It's a brand-new approach to proving the Twin Prime
Conjecture.
Author(S) Details
Zhu Rong Rong
Fudan University, Shanghai, China.
View Book:- https://stm.bookpi.org/RAMRCS-V2/article/view/4450
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