The dimension of the image of the Abel map associated with normal surface singularities

Abstract

Let (X,o) be a complex normal surface singularity with rational homology sphere link and let X be one of its good resolutions. Fix an effective cycle Z supported on the exceptional curve and also a possible Chern class l'∈ H2(X,Z). Define Ecal'(Z) as the space of effective Cartier divisors on Z and cl'(Z): Ecal'(Z) Picl'(Z), the corresponding Abel map. In this note we provide two algorithms, which provide the dimension of the image of the Abel map. Usually, Picl'(Z)=pg, \, Im (cl'(Z)) and codim\, Im (cl'(Z)) are not topological, they are in subtle relationship with cohomologies of certain line bundles. However, we provide combinatorial formulae for them whenever the analytic structure on X is generic. The codim\, Im (cl'(Z)) is related with \h1(X,L)\L∈ Im (cl'(Z)); in order to treat the `twisted' family \h1(X,L0 L)\L∈ Im (cl'(Z)) we need to elaborate a generalization of the Picard group and of the Abel map. The above algorithms are also generalized.