Path lifting properties and embedding between RAAGs

Abstract

For a finite simplicial graph , let G() denote the right-angled Artin group on the complement graph of . In this article, we introduce the notions of "induced path lifting property" and "semi-induced path lifting property" for immersions between graphs, and obtain graph theoretical criteria for the embedability between right-angled Artin groups. We recover the result of S.-h. Kim and T. Koberda that an arbitrary G() admits a quasi-isometric group embedding into G(T) for some finite tree T. The upper bound on the number of vertices of T is improved from 22(m-1)2 to m2m-1, where m is the number of vertices of . We also show that the upper bound on the number of vertices of T is at least 2m/4. Lastly, we show that G(Cm) embeds in G(Pn) for n≥slant 2m-2, where Cm and Pn denote the cycle and path graphs on m and n vertices, respectively.