Small Quotients of Braid Groups
Abstract
We prove that the symmetric group Sn is the smallest non-cyclic quotient of the braid group Bn for n=5,6 and that the alternating group An is the smallest non-trivial quotient of the commutator subgroup Bn' for n = 5,6,7,8. We also give an improved lower bound on the order of any non-cyclic quotient of Bn.
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