Braid groups and mapping class groups for 2-orbifolds

Abstract

The main result of this article is that pure orbifold braid groups fit into an exact sequence 1→ K→π1orb((n-1+L))PZnPZn((L))πPZnPZn-1((L))→1. In particular, we observe that the kernel K of PZn is non-trivial. This corrects Theorem 2.14 in [12](arXiv:2006.07106). Moreover, we use the presentation of the pure orbifold mapping class group PMapid,orbn((L)) from [8] to determine K. Comparing these orbifold mapping class groups with the orbifold braid groups, reveals a surprising behavior: in contrast to the classical case, the orbifold braid group is a proper quotient of the orbifold mapping class group. This yields a presentation of the pure orbifold braid group which allows us to read off the kernel K.