(g,k)-Fermat curves: an embedding of moduli spaces

Abstract

A group H Zk2g, where g,k ≥ 2 are integers, of conformal automorphisms of a closed Riemann surface S is called a (g,k)-Fermat group if it acts freely with quotient S/H of genus g. We study some properties of these type of objects, in particular, we observe that S is non-hyperelliptic and, if k=pr, where p>84(g-1) is a prime integer and r ≥ 1, then H is the unique (g,k)-Fermat group of S. Let be a co-compact torsion free Fuchsian group such that S/H= H2/. If k is its normal subgroup generated by its commutators and the k-powers of its elements, then there is a biholomorphism between S and H2/k congugating H to /k. The inclusion k < induces a natural holomorphic embedding k: T() T(k) of the corresponding Teichm\"uller spaces. Such an embedding induces a holomorphic map, at the level of their moduli spaces, k: M() M(k). As a consequence of the results on (g,k)-Fermat groups, we provide sufficient conditions for the injectivity of k.