Powers of half-twists and congruence subgroups of braid groups

Abstract

In this work, we study the relationship between congruence subgroups Bn[m] and Nn(σ1m) the normal closure of σ1m, where σ1 is the classical generator of Bn. We characterize the conditions under which Nn(σ1m) has finite index in Bn[m] and provide explicit generators for these finite quotients. For the cases where the index is infinite, we show that Bn[m]/Nn(σ1m) contains a free subgroup. Additionally, we compute the Abelianisation of Coxeter braid subgroups in the finite index cases and construct new finite quotients using commutators of congruence subgroups.

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