可計算數
定義
如果一個實數能被某個可計算函數 以下述方式來近似,那麼 就是一個可計算數:給定任何正整數,函數值都滿足:
不可計算數
非可計算的實數即為不可計算數。1975年,計算機學家格里高里·柴廷做了一個有趣的實驗:選擇任意一種程式語言,隨意輸入一段程式碼,該程式碼能夠成功運行並且能夠在有限時間內終止的機率即為柴廷常數,這個數為一個經典的不可計算數。[1]
相關書籍
- . 清华大学出版社有限公司. 2004: 119 [2018-06-30]. ISBN 978-7-3020-8560-7. (原始内容存档于2019-06-17).
參考資料
引用
- . 2011-03-09 [2018-06-30]. (原始内容存档于2019-06-05).
來源
- Oliver Aberth 1968, Analysis in the Computable Number Field, Journal of the Association for Computing Machinery (JACM), vol 15, iss 2, pp 276–299. This paper describes the development of the calculus over the computable number field.
- Errett Bishop and Douglas Bridges, Constructive Analysis, Springer, 1985, ISBN 0-387-15066-8
- Douglas Bridges and Fred Richman. Varieties of Constructive Mathematics, Oxford, 1987.
- Jeffry L. Hirst, Representations of reals in reverse mathematics, Bulletin of the Polish Academy of Sciences, Mathematics, 55, (2007) 303–316.
- 马文·闵斯基 1967, Computation: Finite and Infinite Machines, Prentice-Hall, Inc. Englewood Cliffs, NJ. No ISBN. Library of Congress Card Catalog No. 67-12342. His chapter §9 "The Computable Real Numbers" expands on the topics of this article.
- E. Specker, "Nicht konstruktiv beweisbare Sätze der Analysis" J. Symbol. Logic, 14 (1949) pp. 145–158
- Turing, A.M., , Proceedings of the London Mathematical Society, 2 42 (1), 1936, 42 (1): 230–651937 [2018-08-22], doi:10.1112/plms/s2-42.1.230, (原始内容存档于2004-04-03) (and Turing, A.M., , Proceedings of the London Mathematical Society, 2 43 (6), 1938, 43 (6): 544–61937, doi:10.1112/plms/s2-43.6.544). Computable numbers (and Turing's a-machines) were introduced in this paper; the definition of computable numbers uses infinite decimal sequences.
- Klaus Weihrauch 2000, Computable analysis, Texts in theoretical computer science, Springer, ISBN 3-540-66817-9. §1.3.2 introduces the definition by nested sequences of intervals converging to the singleton real. Other representations are discussed in §4.1.
- Klaus Weihrauch, A simple introduction to computable analysis
- H. Gordon Rice. "Recursive real numbers." Proceedings of the American Mathematical Society 5.5 (1954): 784-791.
- V. Stoltenberg-Hansen, J. V. Tucker "Computable Rings and Fields" in Handbook of computability theory edited by E.R. Griffor. Elsevier 1999
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