[1]HE Hua-can,HE Zhi-tao.Reunifying concepts of infinity[J].CAAI Transactions on Intelligent Systems,2010,5(3):202-220.
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Reunifying concepts of infinity

CAAI Transactions on Intelligent Systems[ISSN 1673-4785/CN 23-1538/TP] Volume: 5 Number of periods: 2010 3 Page number: 202-220 Column: 综述 Public date: 2010-06-25
Title:
Reunifying concepts of infinity
Author(s):
HE Hua-can1 HE Zhi-tao2
1.School of Computer Science, Northwestern Polytechnical University, Xi’〖KG-*1/4〗an 710072, China;
2.School of Computer Science, Beihang University, Beijing 100191, China
Keywords:
actual infinity Turing machine infinite coding invariance continuum hypothesis Hilbert’s problemsnatural number set
CLC:
O144.1; TP18
DOI:
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Abstract:
Georg Cantor was the first person to use mathematical methods to systematically study the concept of infinity. This work formed the basis of set theory, which in turn evolved into the primary theoretical basis for modern mathematics. However, the continuum hypothesis (CH) and the layered actual infinity view in set theory introduced long lasting paradoxes into modern mathematics. Over the past 130 years, many people have worked on CH, but no one has found a way to prove or disprove it. The authors proposed a solution based on the Turing machine. The complete encoding algorithm and the complete decoding algorithm revealed the infinite coding invariance (ICI principle), proving that the real number set is denumerable and CH does not hold. In this way the reunification of the concepts of infinity was established, effectively solving Hilbert’s problem 1. Furthermore, it was proven that infinite sets can all be derived from the natural number set, and the natural number set is the mathematical model of all infinite sets. Finally, we discussed some problems with the mathematical philosophy of infinity. The establishment of a unified concept of infinity forms the basis of an actual infinity theory. It will have a significant effect on mathematics, physics, logic, philosophy and many other scientific disciplines. 
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