Complete scalar-flat Kähler metrics on affine algebraic manifolds
Abstract: Let $(X,L_{X})$ be an $n$-dimensional polarized manifold. Let $D$ be a smooth hypersurface defined by a holomorphic section of $L_{X}$. We prove that if $D$ has a constant positive scalar curvature K\"{a}hler metric, $X \setminus D$ admits a complete scalar-flat K\"{a}hler metric, under the following three conditions: (i) $n \geq 6$ and there is no nonzero holomorphic vector field on $X$ vanishing on $D$, (ii) an average of a scalar curvature on $D$ denoted by $\hat{S}{D}$ satisfies the inequality $0 < 3 \hat{S}{D} < n(n-1)$, (iii) there are positive integers $l(>n),m$ such that the line bundle $K_{X}{-l} \otimes L_{X}{m}$ is very ample and the ratio $m/l$ is sufficiently small.
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