Index of Kato surfaces
classification
🧮 math.DG
keywords
classcompactcurvesindexkatoassociatedbasischern
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The compact curves of an intermediate Kato surface $S$ form a basis of $H^2(S,\mathbb Q)$. We present a way to compute the associated rational coefficients of the first Chern class $c_1(S)$. We get in particular a simple geometric obstruction for $c_1(S)$ to be an integral class, or equivalently index$(S)=1$. We also find an expression for the exponents of the contracting germ of $S$ in terms of self-intersection numbers of the compact curves.
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