Spherical designs and modular forms of the D4 lattice

Abstract

In this paper, we study shells of the D4 lattice with a slight generalization of spherical t-designs due to Delsarte-Goethals-Seidel, namely, the spherical design of harmonic index T (spherical T-design for short) introduced by Delsarte-Seidel. We first observe that, for any positive integer m, the 2m-shell of D4 is an antipodal spherical \10,4,2\-design on the three dimensional sphere. We then prove that the 2-shell, which is the D4 root system, is a tight \10,4,2\-design, using the linear programming method. The uniqueness of the D4 root system as an antipodal spherical \10,4,2\-design with 24 points is shown. We give two applications of the uniqueness: a decomposition of the shells of the D4 lattice in terms of orthogonal transformations of the D4 root system, and the uniqueness of the D4 lattice as an even integral lattice of level 2 in the four dimensional Euclidean space. We also reveal a connection between the harmonic strength of the shells of the D4 lattice and non-vanishing of the Fourier coefficients of a certain newform of level 2. Motivated by this, congruence relations for the Fourier coefficients are discussed.