On the Width of the Cartesian Product of Ordinals

Order Pub Date : 2024-04-06 DOI:10.1007/s11083-024-09668-8
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Abstract

The ordinal invariants, i.e., maximal order type, height, and width, are measures of a well quasi-ordering (wqo) based on the ordinal rank of the trees of its bad sequences, strictly decreasing sequences, and antichain sequences, respectively. Complex wqos are often built from simpler wqos through basic constructions such as disjoint sum, direct sum, cartesian product, and higher-order constructions like powerset or sequences. One main challenge is to compute the ordinal invariants of such wqos compositionally. This article focuses on the width of the cartesian product of wqos, for which no general formula is known. The particular case of the cartesian product of two ordinals has already been solved by Abraham in 1987, using the methods of residuals. We introduce a new method to get lower bounds on width, and apply it to the width of the cartesian product of finitely many ordinals, thus generalizing Abraham’s result. Finally, we leverage this result to compute the width of a generic family of elementary wqos that is closed under cartesian product.

论笛卡尔有序积的宽度
摘要 序不变式,即最大序类型、高度和宽度,是对井准排序(wqo)的度量,分别基于其坏序列、严格递减序列和反链序列的树的序秩。复杂的 wqos 通常是由较简单的 wqos 通过基本结构(如不相交和、直接和、卡特积)和高阶结构(如幂集或序列)构建而成的。其中一个主要挑战是如何以组合方式计算这类 wqos 的序不变式。本文重点讨论 wqos 卡方积的宽度,目前还不知道其一般公式。亚伯拉罕已于 1987 年利用残差法解决了两个序数的笛卡尔积的特殊情况。我们引入了一种获得宽度下限的新方法,并将其应用于有限多个序数的卡方积的宽度,从而推广了亚伯拉罕的结果。最后,我们利用这一结果计算了在卡方积下封闭的基本 wqos 的一般族的宽度。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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