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Snowflake groups and conjugator length functions with non-integer exponents
Published 16 Dec 2025 in math.GR | (2512.14038v1)
Abstract: We exhibit novel geometric phenomena in the study of conjugacy problems for discrete groups. We prove that the snowflake groups $B_{pq}$, indexed by pairs of positive integers $p>q$, have conjugator length functions $\text{CL}(n)\simeq n$ and annular Dehn functions $\text{Ann}(n) \simeq n{2α}$, where $α= \log_2(2p/q)$. Then, building on $B_{pq}$, we construct groups $\tilde{B}_{pq}+$, for which $\text{CL}(n)\simeq n{α+1}$. Thus the conjugator length spectrum and the spectrum of exponents of annular Dehn functions are both dense in the range $[2,\infty)$.
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