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{\bf Emily Berger}
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{\bf Hurwitz Equivalence in Dihedral Groups}
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In this paper we determine the orbits of the braid group $B_n$ action
on $G^n$ when $G$ is a dihedral group and for any $T \in G^n$. We
prove that the following invariants serve as necessary and sufficient
conditions for Hurwitz equivalence. They are: the product of its
entries, the subgroup generated by its entries, and the number of
times each conjugacy class (in the subgroup generated by its entries)
is represented in $T$.
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