Theta functions for singular curves
Abstract
Let X be an irreducible singular Riemann surface, with desingularisation X. The generalised Jacobian J(X) of X fibers over the Jacobian J(X) of X, and there is an Abel map A of X to J(X), lifting the Abel map to J( X). We build a theta function on a compactification of the generalised Jacobian J(X) (giving a section of a suitable positive line bundle). The translation action on J(X) then yields all line bundles of that degree, and the translates of the theta function, restricted to A( X), give a ``universal section'' of the line bundles of that degree over X. This extends to the singular case a classical result of Riemann.
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