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LCK metrics on elliptic principal bundles

For elliptic principal bundles $π:X\ra B$ over Kähler manifolds it was shown by Blanchard that $X$ has a Kähler metric if and only both Chern classes (with real coefficients) of $π$ vanish. For some elliptic principal bundles, when the span of these Chern classes is 1-dimensional, it was shown by Vaisman that $X$ carry locally conformally Kähler (LCK, for short) metrics. We show that in the case when the Chern classes are linearly independent, $X$ carries no LCK metric.

preprint2010arXivOpen access

Victor Vuletescu

math.AG math.DG

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Victor Vuletescu

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LCK metrics on elliptic principal bundles

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