Abstract
To every rational complex curve C \subset (\mathbb C^\times)^n we associate a rational tropical curve \Gamma \subset \mathbb R^n so that the amoeba \mathcal A(C) \subset \mathbb R^n of C is within a bounded distance from \Gamma . In accordance with the terminology introduced in [PR], we call \Gamma the spine of \mathcal A(C) . We use spines to describe tropical limits of sequences of rational complex curves.
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