Let K be an algebraically closed field which is complete with respect to a
nontrivial, non-Archimedean valuation and let \Lambda be its value group. Given
a smooth, proper, connected K-curve X and a skeleton \Gamma of the Berkovich
analytification X^\an, there are two natural real tori which one can consider:
the tropical Jacobian Jac(\Gamma) and the skeleton of the Berkovich
analytification Jac(X)^\an. We show that the skeleton of the Jacobian is
canonically isomorphic to the Jacobian of the skeleton as principally polarized
tropical abelian varieties. In addition, we show that the tropicalization of a
classical Abel-Jacobi map is a tropical Abel-Jacobi map. As a consequence of
these results, we deduce that \Lambda-rational principal divisors on \Gamma, in
the sense of tropical geometry, are exactly the retractions of principal
divisors on X. We actually prove a more precise result which says that,
although zeros and poles of divisors can cancel under the retraction map, in
order to lift a \Lambda-rational principal divisor on \Gamma to a principal
divisor on X it is never necessary to add more than g extra zeros and g extra
poles. Our results imply that a continuous function F:\Gamma -> R is the
restriction to \Gamma of -log|f| for some nonzero meromorphic function f on X
if and only if F is a \Lambda-rational tropical meromorphic function, and we
use this fact to prove that there is a rational map f : X --> P^3 whose
tropicalization, when restricted to \Gamma, is an isometry onto its image.Comment: 21 pages, 1 figur