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Walter Neff
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What I'm looking for is some sort of 'Bertini-theorem' for curves. Let $X$ be a Calabi-Yau manifold and let $C$ be a union of rational curves on $X$. Are there any techniques or results that would allow me to conclude that (perhaps some multiple of) $C$ can be deformed into an irreducible curve?

Edit: I'm looking for conditions on $C$ so that it moves. For example, if $C$ is a divisor on a K3, and $C^2>0$, then a general element in the linear system of some power is smooth by the usual Bertini.

What I'm looking for is some sort of 'Bertini-theorem' for curves. Let $X$ be a Calabi-Yau manifold and let $C$ be a union of rational curves on $X$. Are there any techniques or results that would allow me to conclude that (perhaps some multiple of) $C$ can be deformed into an irreducible curve?

What I'm looking for is some sort of 'Bertini-theorem' for curves. Let $X$ be a Calabi-Yau manifold and let $C$ be a union of rational curves on $X$. Are there any techniques or results that would allow me to conclude that (perhaps some multiple of) $C$ can be deformed into an irreducible curve?

Edit: I'm looking for conditions on $C$ so that it moves. For example, if $C$ is a divisor on a K3, and $C^2>0$, then a general element in the linear system of some power is smooth by the usual Bertini.

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Walter Neff
  • 587
  • 2
  • 15

Deforming curves on Calabi-Yaus

What I'm looking for is some sort of 'Bertini-theorem' for curves. Let $X$ be a Calabi-Yau manifold and let $C$ be a union of rational curves on $X$. Are there any techniques or results that would allow me to conclude that (perhaps some multiple of) $C$ can be deformed into an irreducible curve?