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On the distribution of Lachlan nonsplitting bases
Archive for Mathematical Logic 41 (5):455-482 (2002)
Abstract
We say that a computably enumerable (c.e.) degree b is a Lachlan nonsplitting base (LNB), if there is a computably enumerable degree a such that a > b, and for any c.e. degrees w,v ≤ a, if a ≤ w or; v or; b then either a ≤ w or; b or a ≤ v or; b. In this paper we investigate the relationship between bounding and nonbounding of Lachlan nonsplitting bases and the high /low hierarchy. We prove that there is a non-Low2 c.e. degree which bounds no Lachlan nonsplitting baseLinks
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Citations of this work
Splitting and nonsplitting II: A low {\sb 2$} C.E. degree about which ${\bf 0}'$ is not splittable.S. Barry Cooper & Angsheng Li - 2002 - Journal of Symbolic Logic 67 (4):1391-1430.
A nonlow2 R. E. Degree with the Extension of Embeddings Properties of a low2 Degree.Richard A. Shore & Yue Yang - 2002 - Mathematical Logic Quarterly 48 (1):131-146.
References found in this work
Minimal pairs and high recursively enumerable degrees.S. B. Cooper - 1974 - Journal of Symbolic Logic 39 (4):655-660.
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