矛盾不一定使理论不一致

Pub Date : 2017-01-01 DOI:10.12988/JITE.2017.735
O. Kosheleva, V. Kreinovich
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引用次数: 0

摘要

一些宗教学者声称,虽然相应的神圣文本可能是矛盾的,但它们导致了一套一致的道德和行为建议。这在逻辑上可能吗?在这篇论文中,有些令人惊讶的是,我们证明了这确实是可能的,也就是说,我们证明,如果我们在关于某一类对象的陈述中,加上两个矛盾的抽象陈述的结果,我们仍然保留了一个一致的理论。同样现象的一个更普通的例子来自数学:如果我们有一个独立于ZF的集合理论命题S,它不等于任何算术命题,那么我们可以将从S导出的算术命题和从S导出的算术命题相加,并且仍然保持所得的算术命题类一致。矛盾可以导致一个一致的理论吗?圣书中似乎有逻辑上的矛盾。从纯逻辑的观点来看,圣书经常包含不一致的陈述。例如,《圣经》中有两个不同的创世故事:其一,亚当先被造,夏娃是用他的肋骨造的——因为他在天堂里感到孤独;其二,两个最初的人类是同时被造的。宗教如何对待这种矛盾。对于这种表面上的矛盾,有两种主要方法。第一种方法是试图重新解释文本,使矛盾消失。有趣的是,还有第二种方法(参见,例如,[7]),是的,从我们的观点来看,这可能被视为矛盾,但两者都是矛盾的
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Contradictions Do Not Necessarily Make a Theory Inconsistent
Some religious scholars claim that while the corresponding holy texts may be contradictory, they lead to a consistent set of ethical and behavioral recommendations. Is this logically possible? In this paper, somewhat surprisingly, we kind of show that this is indeed possible: namely, we show that if we add, to statements about objects from a certain class, consequences of both contradictory abstract statements, we still retain a consistent theory. A more mundane example of the same phenomenon comes from mathematics: if we have a set-theoretical statement S which is independent from ZF and which is not equivalent to any arithmetic statement, then we can add both arithmetic statements derived from S and arithmetic statements derived from ¬S and still keep the resulting class of arithmetic statements consistent. 1 Can Contradictions Lead to a Consistent Theory? There are seeming logical contradictions in holy books. From the purely logical viewpoint, holy books often contain inconsistent statements. For example, the Bible has two different stories of creation: • in one, Adam was created first and Eve made out of his rib later on – since he felt lonely in the Paradise, while • in the second one, both first humans were created at the same time. How religions treat such contradictions. There are two main approaches to such seeming contradictions. The first approach is to try to re-interpret the text so that the contradictions disappear. Interestingly, there is also a second approach (see, e.g., [7]), that yes, from our viewpoint, this may be perceived as a contradiction, but both contradictory
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