Homology Covers and Automorphisms: Examples

Abstract

Let S be a Riemann surface with a non-abelian fundamental group and for each integer k ≥ 2 or k=∞, let Sk be its k-homology cover. The surface Sk admits a group of conformal automorphisms Mk H1(S; Zk), where Z∞:= Z, such that S=Sk/Mk. If L ≤ Aut(S), then there is a short exact sequence 1 Mk Lk L 1, where Lk is a subgroup of conformal automorphisms of Sk. In general, the above exact sequence does not need to be split. This paper investigates situations when the splitting is or is not obtained.

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