Some special families of hyperelliptic curves

Abstract

Let gG denote the locus of hyperelliptic curves of genus g whose automorphism group contains a subgroup isomorphic to G. We study spaces gG for G n, 2n, 2A4, or SL2(3). We show that for G n, 2n, the space gG is a rational variety and find generators of its function field. For G 2A4, SL2(3) we find a necessary condition in terms of the coefficients, whether or not the curve belongs to gG. Further, we describe algebraically the loci of such curves for g≤ 12 and show that for all curves in these loci the field of moduli is a field of definition.