On finite quotients of surface braid groups having order at most 127
Abstract
Let b be a compact Riemann surface of genus b ≥ 2 and let P2(b)=π1(b × b - ) be the corresponding pure braid group on two strands. A finite quotient P2(b) G is called "admissible" if does not factor through π1(b × b). In this work we classify all admissible quotients of P2(b) such that |G| ≤ 127.
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