On cyclic coverings of the torus

Abstract

We study tori which are cyclic covers of the standard torus, that is, the deck transformation group of the covering map is cyclic. These covering tori can be parametrized in a natural way and we show that being cyclic is equivalent to certain arithmetic condition on these parameters. There is a natural SL(2,Z)-action on covering tori and introducing a complete numeric SL(2,Z)-invariant we show that, for n∈N, all n-tuple cyclic covers are in the same SL(2,Z)-orbit. We show that cyclic covers are irreducible in a precise sense and we give the exact and asymptotic number of these covers.