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A Solution to the Famous “Twin’s Problem”
A Solution to the Famous “Twin’s Problem”
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In the following pages I will try to give a solution to this very known unsolved problem of theory of numbers. The solution is given here with an important analysis of the proof of formula (4.18), with the introduction of special intervals between square of prime numbers that I call silver intervals . And I make introduction of another also new mathematic phenomenon of logical proposition “In mathematics nothing happens without reason” for which I use the ancient Greek term “catholic information”. From the theorem of prime numbers we know that the expected multitude of prime numbers in an interval is given by formula ?considering that interval as a continuous distribution of real numbers that represents an elementary natural numbers interval. From that we find that in the elementary interval around of a natural number ν we easily get by dx=1 the probability that has the ν to be a prime number. From the last formula one can see that the second part of formula (4.18) is absolutely in agreement with the above theorem of prime numbers. But the benefit of the (4.18) is that this formula enables correct calculations in set N on finding the multitude of twin prime numbers, in contrary of the above logarithmic relation which is an approximation and must tend to be correct as ν tends to infinity. Using the relationship (4.18) we calculate here the multitude of twins in N, concluding that this multitude tends to infinite. But for the validity of the computation, the distribution of the primes in a random silver interval is examined, proving on the basis of catholic information that the density of primes in the same random silver interval is statistically constant. Below, in introduction, we will define this concept of “catholic information” stems of “information theory” [1] and it is defined to use only general forms in set N, because these represent the set N and not finite parts of it. This concept must be correlated to Riemann Hypothesis.
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| 篇名 | A Solution to the Famous “Twin’s Problem” | ||
| 来源期刊 | 理论数学进展(英文) | 学科 | 数学 |
| 关键词 | Twin PROBLEM Twin’s PROBLEM Unsolved Mathematical PROBLEMS Prime NUMBER PROBLEMS Millennium PROBLEMS Riemann HYPOTHESIS Rie-mann’s HYPOTHESIS NUMBER THEORY Information THEORY Probabilities Statistics | ||
| 年,卷(期) | 2019,(9) | 所属期刊栏目 | |
| 研究方向 | 页码范围 | 794-826 | |
| 页数 | 33页 | 分类号 | O1 |
| 字数 | 语种 | ||
| DOI | |||
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Twin
PROBLEM
Twin’s
PROBLEM
Unsolved
Mathematical
PROBLEMS
Prime
NUMBER
PROBLEMS
Millennium
PROBLEMS
Riemann
HYPOTHESIS
Rie-mann’s
HYPOTHESIS
NUMBER
THEORY
Information
THEORY
Probabilities
Statistics
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理论数学进展(英文)
主办单位:
美国科研出版社
出版周期:
月刊
ISSN:
2160-0368
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出版地:
武汉市江夏区汤逊湖北路38号光谷总部空间
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609
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