On the variety associated to the ring of theta constants in genus 3

Abstract

Due to fundamental results of Igusa and Mumford the N=2g-1(2g+1) even theta constants define for each genus g an injective holomorphic map of the Satake compactification Xg(4,8)=Hg/g[4,8] into the projective space PN-1. Moreover, this map is biholomorphic onto the image outside the Satake boundary. It is not biholomorphic on the whole in the cases g 6. Igusa also proved that in the cases g 2 this map is biholomorphic onto the image. In this paper we extend this result to the case g=3. So we show that the theta map X3(4,8) P35 is biholomorphic onto the image. This is equivalent to the statement that the image is a normal subvariety of P35 .