On a ring of modular forms related to the Theta gradients map in genus 2

Abstract

The level moduli space Ag4,8 is mapped to the projective space by means of gradients of odd Theta functions, such a map turning out no to be injective in the genus 2 case. In this work a congruence subgroup is located between 2(4,8) and 2(2,4) in such a way the map factors on the related level moduli space A, the new map being injective on A. Satake's compactification ProjA() and the desingularization ProjS() are also due to be investigated, since the map does not extend to the boundary of the compactification; to aim at this, an algebraic description is provided, by proving a structure theorem both for the ring of modular forms A() and the ideal of cusp forms S()