Dense Conjugacy Classes and Stability of Locally Finite Graphs
Abstract
Mapping class groups of locally finite graphs are the analogue of those of infinite-type surfaces, and serve as a "big" version of Out(Fn). In this paper, we investigate which of these mapping class groups have a dense conjugacy class. We obtain a complete classification for self-similar locally finite graphs, and show that a large class of mapping class groups do not have a dense conjugacy class. One of the main tools we develop is flux homomorphisms, which we define for a broad class of locally finite graphs. Along the way, we develop a combinatorial notion for locally finite graphs, and we use it to provide a simple criterion for determining whether a locally finite graph is stable.
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