How Many Reflections Make a Dihedral Set Large?
Abstract
Given a size-k subset S of a group G, how large can the product set Sn be? We study this question, at several layers of refinement, for the infinite dihedral group. First, we give an explicit formula for the maximum size of Sn among all size-k subsets with a prescribed number of reflections. We then determine the optimal number of reflections that a size-k set should contain in order to maximize |Sn|. When k is fixed and n∞, we obtain a clean asymptotic expression for the maximal size of Sn. Moreover, we compute this asymptotic separately for each fixed number of reflections in S. We show that the number of reflections influences the asymptotic size of Sn only through a multiplicative coefficient, which admits a direct probabilistic interpretation. Finally, we compute the growth exponent of the maximum of |Sn| when~k=~n.
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