See my preprint http://arxiv.org/abs/1410.5293 Theorem 3.2 on page 7ff.: Let $S$ be a regular, Noetherian, integral, separated scheme, and $g: \{\eta\} \hookrightarrow S$ the inclusion of the generic point. Let $\mathcal{A}/S$ be an Abelian scheme. Then $$ \mathcal{A} = g_*g^*\mathcal{A} $$ as sheaves on $S_{\mathrm{sm}}$.