Roots of hyperelliptic involutions and braid groups modulo their center inside mapping class groups
Abstract
Let n,k∈N and let S be the closed surface of genus nk. A copy of the braid group on 2k+2 strands modulo its center is found inside Mod(S), provided n≥ 3. In particular, for k=1 the class of the half-twist braid inside B4/Z(B4) is identified with a hyperelliptic involution inside Mod(S). As a consequence, we can show that each hyperelliptic involution inside Mod(S) has infinitely many square roots, and discuss their conjugacy classes. Furthermore, a copy of Mod(S1)2(Z) is found inside Mod(S2). This subgroup contains the unique hyperelliptic involution on S2. As a result, we can show that the latter admits infinitely many square and cubic roots, and discuss their conjugacy classes.
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