Spherical designs for finite quaternionic unit groups and their applications to modular forms
Abstract
For a finite subset of the -dimensional unit sphere, the harmonic strength of is the set of such that for all harmonic polynomials of homogeneous degree . We will study three exceptional finite groups of unit quaternions, called the binary tetrahedral group of order 24, the octahedral group of order 48, and the icosahedral group of order 120, which can be viewed as a subset of the 3-dimensional unit sphere. For these three groups, we determine the harmonic strength and show the minimality and the uniqueness as spherical designs. In particular, the group is unique as a minimal subset of the 3-dimensional unit sphere with , where denotes the set of all positive odd integers. This result provides the first characterization of from the spherical design viewpoint. For , we consider the lattice generated by over on which the group acts on by multiplication, where are the ring of integers. We introduce the spherical theta function attached to the lattice and a harmonic polynomial of degree and prove that they are modular forms. By applying our results on the characterization of as a spherical design, we determine the cases in which the -vector space spanned by all of harmonic polynomials of homogeneous degree has dimension zero--without relying on the theory of modular forms.
Cite
@article{arxiv.2507.01358,
title = {Spherical designs for finite quaternionic unit groups and their applications to modular forms},
author = {Masatake Hirao and Hiroshi Nozaki and Koji Tasaka},
journal= {arXiv preprint arXiv:2507.01358},
year = {2025}
}