Conjugator Length in the Baumslag-Gersten Group
Abstract
We show that the conjugator length function of the Baumslag-Gersten group is bounded above and below by a tower of exponentials of logarithmic height -- in particular it grows faster than any tower of exponentials of fixed height. We conjecture that no one-relator group has a larger conjugator length function than the Baumslag-Gersten group. Along the way, we also show that the conjugator length function of the m-th iterated Baumslag-Solitar groups is equivalent to the m-times iterated exponential function.
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