Whittaker groups and hyperelliptic curves

Abstract

Let K be a complete, non-archimedean valued field with a residue field of characteristic different from 2. A Whittaker group G is a discontinuous subgroup of PGL(2,K), freely generated by elements s0,...,sg of order two, each defined by a pair of fixed points a0,b0,...,ag,bg. These fixed points are called ``in good position''. A subgroup W in G of index 2 is a Schottky group and produces a hyperelliptic Mumford curve Omega/W --> Omega/G = P1, called `Whittaker curve', of genus g and with branch locus B in P1(K). An explicit parametrization of Whittaker curves in terms of theta functions for W and G and the data of the fixed points, is developed. In particular, this allows one to express the branched points (and other data such as p-adic periods and p-adic heights) in terms of values of theta functions. A central theme of this paper is the relation between the fixed points and the branch locus. For a given configuration (P,m) of g+1 pairs of points in P1, one defines a rigid space FixP,m of fixed points in good position with that configuration and a rigid space of branched points $ BranchP,m in that configuration. A main result is that the natural morphism FB: FixP,m --> BranchP,m is a rigid etale covering with Galois group 1d-1 for some d>0. For all cases of genus g=2,3 (and for some more), an approximation of FB is computed which confirms the main result. Classification of Whittaker groups and analytic reductions of Whittaker curves is another important issue of this paper. The background material in this paper complements the work of L.~Gerritzen, G.~Van Steen, F.~Herrlich and others. It involves re-examination of some proofs, the derivation of properties of semi-stable analytic reductions and studying good position of fixed points.