On the Bielliptic and bihyperelliptic loci

Abstract

We study some particular loci inside the moduli space Mg, namely the bielliptic locus (i.e. the locus of curves admitting a 2:1 cover over an elliptic curve E) and the bihyperelliptic locus (i.e. the locus of curves admitting a 2:1 cover over a hyperelliptic curve C', g(C') ≥ 2). We show that the bielliptic locus is not a totally geodesic subvariety of Ag if g ≥ 4 (while it is for g=3, see [16]) and that the bihyperelliptic locus is not totally geodesic in Ag if g ≥ 3g'. We also give a lower bound for the rank of the second gaussian map on the generic point of the bielliptic locus and an upper bound for this rank for every bielliptic curve.