Low complexity Haar null sets without G_(δ) hulls in Z^ω

We show that for every $2\le \xi<\omega_1$ there exists a Haar null set in $\mathbb{Z}^\omega$ that is the difference of two $\mathbf{\Pi}^0_\xi$ sets but not contained in any $\mathbf{\Pi}^0_\xi$ Haar null set. In particular, there exists a Haar null set in $\mathbb{Z}^\omega$ that is the difference of two $G_\delta$ sets but not contained in any $G_\delta$ Haar null set. This partially answers a question of M. Elekes and Z. Vidny\'anszky. To prove this, we also prove a theorem which characterizes the Haar null subsets of $\mathbb{Z}^\omega$.