A rigid analytic proof that the Abel-Jacobi map extends to compact-type models

Let K be a non-Archimedean valued field with valuation ring R. Let $C_\eta $ be a K-curve with compact-type reduction, so its Jacobian $J_\eta $ extends to an abelian R-scheme J. We prove that an Abel-Jacobi map $\iota \colon C_\eta \to J_\eta $ extends to a morphism $C\to J$ , where C is a compact-type R-model of J, and we show this is a closed immersion when the special fiber of C has no rational components. To do so, we apply a rigid-analytic "fiberwise" criterion for a morphism to extend to integral models, and geometric results of Bosch and Lutkebohmert on the analytic structure of $J_\eta $ .