玻尔阶维

Dilip Raghavan, Ming Xiao
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引用次数: 0

摘要

我们引入并研究了伯尔准阶的伯尔阶维度概念。我们将证明这个概念与简单有向图的伯尔二色数概念密切相关。我们证明了一个二分法,它是对 ${\GGG}_{0}$ 二分法的概括,也是对 Borel 简单有向图的 Borel 二色数的概括。通过把这个二分法应用于伯尔准阶,我们证明了另一个二分法,它描述了伯尔维可数的伯尔准阶的特征。通过证明它们都是伯尔线性化的,我们得到了关于伯尔维可数的伯尔准阶的进一步结构信息。然后,我们对局部可数的伯尔准阶进行了更详细的研究,特别关注图灵度,并得出了集合论模型,在这些模型中,连续度是任意大的,而所有局部可数的伯尔准阶的伯尔维都小于连续度。将我们在这里的结果与先前的工作结合起来,可以发现图灵度的伯尔阶维度通常严格大于其经典阶维度。
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Borel Order Dimension
We introduce and study a notion of Borel order dimension for Borel quasi orders. It will be shown that this notion is closely related to the notion of Borel dichromatic number for simple directed graphs. We prove a dichotomy, which generalizes the ${\GGG}_{0}$-dichotomy, for the Borel dichromatic number of Borel simple directed graphs. By applying this dichotomy to Borel quasi orders, another dichotomy that characterizes the Borel quasi orders of uncountable Borel dimension is proved. We obtain further structural information about the Borel quasi orders of countable Borel dimension by showing that they are all Borel linearizable. We then investigate the locally countable Borel quasi orders in more detail, paying special attention to the Turing degrees, and produce models of set theory where the continuum is arbitrarily large and all locally countable Borel quasi orders are of Borel dimension less than the continuum. Combining our results here with earlier work shows that the Borel order dimension of the Turing degrees is usually strictly larger than its classical order dimension.
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