The degree of commutativity of wreath products with infinite cyclic top group

Abstract

The degree of commutativity of a finite group is the probability that two uniformly and randomly chosen elements commute. This notion extends naturally to finitely generated groups G: the degree of commutativity dcS(G), with respect to a given finite generating set S, results from considering the fractions of commuting pairs of elements in increasing balls around 1G in the Cayley graph C(G,S). We focus on restricted wreath products the form G = H t , where H 1 is finitely generated and the top group t is infinite cyclic. In accordance with a more general conjecture, we show that dcS(G) = 0 for such groups G, regardless of the choice of S. This extends results of Cox who considered lamplighter groups with respect to certain kinds of generating sets. We also derive a generalisation of Cox's main auxiliary result: in `reasonably large' homomorphic images of wreath products G as above, the image of the base group has density zero, with respect to certain types of generating sets.

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