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引用次数: 0

摘要

给出了在有理数与正整数之间建立有效可计算双射的方法。也就是说,给定标准表示法a/b中的一个有理数,其中a、b为整数,我们可以用a和b的位长在时间多项式中计算其在枚举中的位置n。反过来,给定枚举中的位置n,我们可以用n的位长在时间多项式中计算该位置对应的有理数a/b。这并不是文献中第一次出现这样的双映射。然而,我们认为这里提出的方法,使用König对Schröder-Bernstein定理的证明,相对简单易懂,并且具有广泛的应用。它可以应用于枚举其他可数集合。作为一个例子,我们用它给出了代数数与正整数之间的多项式时间双射。
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Enumerating Denumerable Sets in Polynomial Time via the Schröder--Bernstein Theorem
We give methods to develop efficiently computable bijections between the rational numbers and the positive integers. That is, given a rational number in the standard representation a/b, where a, b are integers, we can compute n, its position in the enumeration, in time polynomial in the bit lengths of a and b. Conversely, given a position n in the enumeration, we can compute the corresponding rational number a/b at that position in time polynomial in the bit length of n. This is not the first such bijection to have appeared in the literature. However, we submit that the method presented here, which uses König's proof of the Schröder-Bernstein Theorem, is relatively simple to understand, and has a broad application. It can be applied to enumerating other denumerable sets. As an example, we use it to give a polynomial-time bijection between the algebraic numbers and the positive integers.
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