Spherical growth of reciprocal classes in the Hecke Groups
Abstract
Let p denote the Hecke group where p=2r, r>0. Let Nl denote the set of conjugacy classes of reciprocal elements of word length l in p. We prove that for l ∞, |Nl| = O( l+12 s-1 l+12 ), where O is the `big O', ∈ [2, 2] is the unique positive real root of p(x) = xr+1 - 2Σj=1r-1 xr-j - 1, and s is the maximal multiplicity among the roots of p(x). Our method relies on the free product structure of the Hecke group p, a combinatorial counting function, and recurrence relations derived from cyclically reduced representatives. We also derive that the growth rate of the primitive reciprocal classes of word length l is in agreement with that of Nl. This work generalizes previous results for odd p and provides an explicit asymptotic bound for all Hecke groups.
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