[1]ZHANG Jincheng.Fixed terms and undecidable propositions in logical and mathematical calculus (Ⅱ)[J].CAAI Transactions on Intelligent Systems,2014,9(5):618-631.[doi:10.3969/j.issn.1673-4785.201310076]
Copy
Fixed terms and undecidable propositions in logical and mathematical calculus (Ⅱ)
CAAI Transactions on Intelligent Systems[ISSN 1673-4785/CN 23-1538/TP] Volume:
9
Number of periods:
2014 5
Page number:
618-631
Column:
学术论文—人工智能基础
Public date:
2014-10-25
- Title:
- Fixed terms and undecidable propositions in logical and mathematical calculus (Ⅱ)
- Keywords:
- positive term; inverse term; fixed term; paradox; fixed term outside U; undecidable proposition; incomplete theorem; diagonal method; uncountable set; halting problem
- CLC:
- B813;TP18
- DOI:
- 10.3969/j.issn.1673-4785.201310076
- Abstract:
- As a kind of broad and deep mathematical phenomenon, fixed point has penetrated into all fields of mathematics. This paper extends the fixed point to the logical thinking. It proves that Russell’s paradox is the fixed term in accordance with the set theory. It also proves that G?del’s undecidable proposition is the fixed term within the natural number system N. The term formed by Cantor’s diagonal method is fixed term and undecidable Turning is also fixed term. Furthermore, it can be proven that when a known set U is divided into a positive set and an inverse set and if the fixed term is neither in the positive set nor in the inverse set, then this fixed term must be that outside U. Thus, it is an inherent phenomenon of the system that the logical property of the fixed term excluded from U has changed relative to U and the theorem of fixed term outside U is undecidable. In addition, there are also fixed terms in the natural number system N, where the existence and undecidability do not exert effect on the recursive nature of positive and inverse sets and the completeness of system. Therefore, the mathematical proof for G?del’s theorem cannot be true and Cantor’s diagonal method is proved to be false and Turning’s halting problem is proved to be false. Whether the system N can be complete, real number is countable or not, whether Turning’s halt problem can be decided should be reconsidered.
- References:
-
[1] 陈汝栋. 不动点理论及应用 [M].北京:国防工业出版社, 2012:1-4.
[2] 戴牧民, 陈海燕.公理集合论导引[M].北京:科学出版社, 2011:15-17.
[3] 张金成. 容纳矛盾的逻辑系统与悖论 [J]. 系统智能学报, 2012, 7(3):208-209.
[4] HAMILTON A G. Logic for Mathematicians[D]. Cambridge:University of Cambridge, 1978:29-40, 82-92.
[5] 李未.数理逻辑 [M].北京:科学出版社, 2008:105-110.
[6] 张立昂.可计算性与计算的复杂性 [M].北京:北京大学出版社, 2011:80-85.
[7] 克林 S C. 元数学导论[M]. 莫绍揆, 译.北京:科学出版社, 1984:4-12.
[8] 何华灿. 泛逻辑学原理 [M].北京:科学出版社, 2001:1-15.
[9] Boolos. 可计算性与数理逻辑 [M]. 北京:电子工业出版社, 2002:152-160.
[10] 汪芳庭.数理逻辑 [M]. 北京:科学出版社, 2001:159-163.
- Similar References:
Memo
-
Last Update:
1900-01-01