On the degree-1 Abel map for nodal curves
Abstract
Let C be a nodal curve and L be an invertible sheaf on C. Let αL:C JC be the degree-1 rational Abel map, which takes a smooth point Q∈ C to [ mQ L] in the Jacobian of C. In this work we extend αL to a morphism αL:C→JEP taking values on Esteves' compactified Jacobian for any given polarization E. The maps αL are limits of Abel maps of smooth curves of the type αL.
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