On Symplectic Coverings of the Projective Plane
Abstract
We prove that a resolution of singularities of any finite covering of the projective plane branched along a Hurwitz curve H and, maybe, along a line "at infinity" can be embedded as a symplectic submanifold into some projective algebraic manifold equipped with an integer K\"ahler symplectic form (assuming that if H has negative nodes, then the covering is non-singular over them). For cyclic coverings we can realize this embeddings into a rational algebraic 3--fold. Properties of the Alexander polynomial of H are investigated and applied to the calculation of the first Betti number b1( Xn) of a resolution Xn of singularities of n-sheeted cyclic coverings of C P2 branched along H and, maybe, along a line "at infinity". We prove that b1( Xn) is even if H is an irreducible Hurwitz curve but, in contrast to the algebraic case, that it can take any non-negative value in the case when H consists of several irreducible components.
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