Asymmetrizing infinite trees
Abstract
A graph G is asymmetrizable if it has a set of vertices whose setwise stablizer only consists of the identity automorphism. The motion m of a graph is the minimum number of vertices moved by any non-identity automorphism. It is known that infinite trees T with motion m=0 are asymmetrizable if the vertex-degrees are bounded by 2m. We show that this also holds for arbitrary, infinite m, and that the number of inequivalent asymmetrizing sets is 2|T|.
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