Coxeter-type quotients of surface braid groups

Abstract

Let M be a closed surface, q≥ 2 and n≥ 2. In this paper, we analyze the Coxeter-type quotient group Bn(M)(q) of the surface braid group Bn(M) by the normal closure of the element σ1q, where σ1 is the classic Artin generator of the Artin braid group Bn. Also, we study the Coxeter-type quotient groups obtained by taking the quotient of Bn(M) by the commutator subgroup of the respective pure braid group [Pn(M),Pn(M)] and adding the relation σ1q=1, when M is a closed orientable surface or the disk.

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