哥德尔的不完全定理就象一个恶作剧。
《哥德尔,艾瑟尔,巴赫》由道格拉斯·霍夫·斯塔特纂写。
介绍了哥德尔不完全性定理,论述了它的由来与意义。
Godel's incomplete theorems are introduced, the origin and the significance of Godel's incomplete theorems are discussed.
我只是在看,对吗?,不,海哥德尔说,这是不切合实际的。
I'm just looking. Right? No, Heidegger says, this is a total illusion.
在这一点上,达尔似乎和哥德尔心心相通,拥有哈耶克式的知识论。
Dale and Godel seem to be kindred spirits in this point, with Hayekian knowledge theory.
哥德尔不完备性定理抽走了数学家的逻辑美信仰,数学界出现了信仰危机。
Godel theorem made mathematicians lose their belief of logic beauty, the crisis of belief appeared in mathematical field.
哥德尔提出不完全性定理之后,众多解决悖论的方案开始深入语言的领域。
After Gdel's the Incompleteness Theorem, more and more paradox resolutions began to penetrate deeply into the realm of language.
这其中也体现了哥德尔用过的强力想法,数字本身和对数字的操作,没有实质的区别。
But underneath there lay the same powerful idea that Gdel had used, that there was no essential distinction between 'Numbers' and operations on Numbers.
哥德尔不完全性定理越来越受到人们的垂青和重视,但有些却是错解,需要予以澄清。
G? Del's incompleteness theorem is getting more and more attention, but some solutions are wrong, need to be cleared off.
工作哥德尔表明,任何有用的系统算法可以是一致的和完整的:见哥德尔的不完备性定理。
Thework of Kurt Gödel has shown that no useful system of arithmetic can beboth consistent and complete: see Gödel's incompleteness theorems.
工作哥德尔表明,任何有用的系统算法可以是一致的和完整的:见哥德尔的不完备性定理。
Thework of Kurt Gödel has shown that no useful system of arithmetic can beboth consistent and complete: see Gödel's incompleteness theorems.
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