Intrinsically quasi-isometric sections in metric spaces


Abstract


This note contributes to the study of large-scale geometry. Specifically, we introduce the concept of intrinsically quasi-isometric sections in metric spaces and investigate their properties. In particular, we examine their Ahlfors-David regularity at large scales. Building on Cheeger's theory, we define appropriate sets that enable the determination of convexity and establish whether these sections form a vector space over \mathbb{R} or \mathbb{C}. Furthermore, inspired by Cheeger's approach, we propose an equivalence relation for this class of sections. Throughout the paper, we employ fundamental mathematical tools.

Keywords: Large scale geometry; Quasi-isometric graphs; vector space; Ahlfors-David regularity; Metric spaces

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