Connected components of Morse boundaries of graphs of groups
Abstract
Let a finitely generated group G split as a graph of groups. If edge groups are undistorted and do not contribute to the Morse boundary ∂MG, we show that every connected component of ∂MG with at least two points originates from the Morse boundary of a vertex group. Under stronger assumptions on the edge groups (such as wideness in the sense of Drutu-Sapir), we show that Morse boundaries of vertex groups are topologically embedded in ∂MG.
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