The Jacobian of a nonorientable Klein surface
Abstract
Using divisors, an analog of the Jacobian for a compact connected nonorientable Klein surface Y is constructed. The Jacobian is identified with the dual of the space of all harmonic real one-forms on Y quotiented by the torsion-free part of the first integral homology of Y. Denote by X the double cover of Y given by orientation. The Jacobian of Y is identified with the space of all degree zero holomorphic line bundles L over X with the property that L is isomorphic to σ*L, where σ is the involution of X.
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