Abstract

We define a notion of modular forms of half-integral weight on the quaternionic exceptional groups. We prove that they have a well-behaved notion of Fourier coefficients, which are complex numbers defined up to multiplication by ${\pm }1$ . We analyze the minimal modular form $\Theta _{F_4}$ on the double cover of $F_4$ , following Loke–Savin and Ginzburg. Using $\Theta _{F_4}$ , we define a modular form of weight $\tfrac {1}{2}$ on (the double cover of) $G_2$ . We prove that the Fourier coefficients of this modular form on $G_2$ see the $2$ -torsion in the narrow class groups of totally real cubic fields.

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