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arxiv: math/9201267 · v1 · pith:INRXXXEJnew · submitted 1992-01-01 · 🧮 math.CV · math.AG

Lifting of cohomology and unobstructedness of certain holomorphic maps

classification 🧮 math.CV math.AG
keywords deformationsliftinggivegroupholomorphicinfinitesimalmanifoldsproperty
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Let $f$ be a holomorphic mapping between compact complex manifolds. We give a criterion for $f$ to have {\it unobstructed deformations}, i.e. for the local moduli space of $f$ to be smooth: this says, roughly speaking, that the group of infinitesimal deformations of $f$, when viewed as a functor, itself satisfies a natural lifting property with respect to infinitesimal deformations. This lifting property is satisfied e.g. whenever the group in question admits a `topological' or Hodge-theoretic interpretation, and we give a number of examples, mainly involving Calabi-Yau manifolds, where that is the case.

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