Hyperelliptic quotients of generalized Humbert curves
Abstract
A group H Z2n, n ≥ 3, of conformal automorphisms of a closed Riemann surface S such that S/H has genus zero and exactly (n+1) cone points is called a generalized Humbert group of type n, in which case, S is called a generalized Humbert curve of type n. It is known that a generalized Humbert curve S of type n ≥ 4 is non-hyperelliptic and that it admits a unique generalized Humbert group H of type n. We describe those subgroups K of H, acting freely on S, such that S/K is hyperelliptic.
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