A computably categorical structure whose expansion by a constant has infinite computable dimension

Denis R. Hirschfeldt; Bakhadyr Khoussainov; Richard A. Shore

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A computably categorical structure whose expansion by a constant has infinite computable dimension

机译：可计算的分类结构，其被常数扩展具有无限的可计算维数

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摘要

Cholak, Goncharov, Khoussainov, and Shore showed that for each k>0 there is a computably categorical structure whose expansion by a constant has computable dimension k. We show that the same is true with k replaced by ω. Our proof uses a version of Goncharov’s method of left and right operations.

机译：Cholak，Goncharov，Khoussainov和Shore指出，对于每个k> 0，存在一个可计算的分类结构，其常数扩展具有可计算的维数k。我们证明，用ω代替k也是一样。我们的证明使用了Goncharov左右操作方法的一种形式。

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《Journal of Symbolic Logic 》 |2003年第4期| 共43页
作者
Denis R. Hirschfeldt; Bakhadyr Khoussainov; Richard A. Shore;
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正文语种 eng
中图分类概率论与数理统计 ;
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A computably categorical structure whose expansion by a constant has infinite computable dimension

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