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Smooth metrics on jet bundles and applications - MaRDI portal

Smooth metrics on jet bundles and applications (Q847005)

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Smooth metrics on jet bundles and applications
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    Smooth metrics on jet bundles and applications (English)
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    10 February 2010
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    By an induction process, for each \(k\geq 1\), the \(k\)-th (anti)tautological line bundle \(\mathcal{O}_{X_{k}}(1)\) of an arbitrary complex directed manifold \((X,V)\) is endowed with a natural smooth Hermitian metric. The Chern curvature form for this metric is computed recursively, and the author shows that it depends asymptotically only on the curvature of \(V\) and on the structure of the fibration \(X_{k}\to X\). When \(X\) is a surface and \(V=T_{X}\), there are given explicit formulae to write down the above curvature, as a product of matrices. As an application, the author gives a new proof of the existence of global invariant jet differentials vanishing on an ample divisor, for a minimal surface \(X\) of general type whose Chern classes satisfy certain inequalities, without using a strong vanishing theorem of \textit{F.~A.~Bogomolov} [Sov. Math., Dokl. 18(1977), 1294--1297 (1978); translation from Dokl. Akad. Nauk SSSR 236, 1041--1044 (1977; Zbl 0415.14013)].
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    jet bundle
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    Hermitian metric on line bundle
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