可计算性与对称差分算子

Log. J. IGPL Pub Date : 2021-06-08 DOI:10.1093/JIGPAL/JZAB017

U. Andrews, Peter M. Gerdes, S. Lempp, Joseph S. Miller, N. Schweber

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引用次数: 0

摘要

集合上的组合操作几乎从来没有很好地定义在图灵度上，这个事实是如此明显，反例值得展示。我们关注的情况是对称差分算子;有一对(非零)度，它们的对称差分操作定义得很好。从文献中可以提取出一些例子，例如从强极小覆盖的非零度的存在中。我们集中讨论不可比较的r.e.度的情况，其中对称差分运算是很好定义的。

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Computability and the Symmetric Difference Operator

Combinatorial operations on sets are almost never well defined on Turing degrees, a fact so obvious that counterexamples are worth exhibiting. The case we focus on is the symmetric-difference operator; there are pairs of (nonzero) degrees for which the symmetric-difference operation is well defined. Some examples can be extracted from the literature, e.g. from the existence of nonzero degrees with strong minimal covers. We focus on the case of incomparable r.e. degrees for which the symmetric-difference operation is well defined.

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Log. J. IGPL

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