I would appreciate any guidance to help me prove the claim below.
Let $X$ be a nonrational surface (say a blowup of points on a nonrational minimal model Y), the set of irreducible curves $C$ satisfying $C^2=K_{X} \cdot C = -1$ is always finite.
2026-05-05 18:41:46.1778006506
-1-curves on a nonrational surface.
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