The maximal coarse Baum-Connes conjecture for spaces that admit an A-by-FCE coarse fibration structure

Liang Guo, Qin Wang, Chen Zhang
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Abstract

In this paper, we introduce the concept of an A-by-FCE coarse fibration structure for metric spaces, which serves as a generalization of the A-by-CE structure for a sequence of group extensions proposed by Deng, Wang, and Yu. We show that the maximal coarse Baum-Connes conjecture holds for metric spaces with bounded geometry that admit an A-by-FCE coarse fibration structure. As an application, the relative expanders constructed by Arzhantseva and Tessera, as well as the box space derived from an extension of Haagerup groups by amenable groups, are shown to exhibit the A-by-FCE coarse fibration structure. Consequently, their maximal coarse Baum-Connes conjectures are affirmed.
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允许 A-by-FCE 粗纤维结构的空间的最大粗鲍姆-康内斯猜想
在本文中,我们介绍了公元空间的 A-by-FCE 粗纤维结构的概念,它是对邓、王和余提出的群扩展序列的 A-by-CE 结构的概括。我们发现,最大粗糙度鲍姆-康内斯猜想对于具有有界几何的公元空间是成立的,而这些公元空间都承认 A-by-FCE 粗糙度纤维结构。作为应用,Arzhantseva 和 Tessera 构建的相对扩展器,以及由可亲群对 Haagerup 群的扩展衍生出的箱形空间,都显示出 A-by-FCE 粗傅里叶结构。
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