Low-genus primitive monodromy groups with a nonunique minimal normal subgroup
Abstract
Let X be a Riemann surface, and let f:X1C be an indecomposable (branched) covering of genus g and degree n whose monodromy group has more than one minimal normal subgroup. Closing a gap in the literature, we show that there is only one such covering when g≤ 1. Moreover, for arbitrary g, there are no such coverings with ng 0 sufficiently large.
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