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CANONICAL FILTRATIONS AND STABILITY OF DIRECT IMAGES BY FROBENIUS MORPHISMS
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- KITADAI YUKINORI
- Department of Mathematics, Graduate School of Science, Hiroshima University
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- SUMIHIRO HIDEYASU
- Department of Mathematics, Graduate School of Science, Hiroshima University
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Description
We study the stability of direct images by Frobenius morphisms. First, we compute the first Chern classes of direct images of vector bundles by Frobenius morphisms modulo rational equivalence up to torsions. Next, introducing the canonical filtrations, we prove that if $X$ is a nonsingular projective minimal surface of general type with semistable $\Omega_X^1$ with respect to the canonical line bundle $K_X$, then the direct images of line bundles on $X$ by Frobenius morphisms are semistable with respect to $K_X$.
Journal
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- Tohoku Mathematical Journal, Second Series
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Tohoku Mathematical Journal, Second Series 60 (2), 287-301, 2008
Mathematical Institute, Tohoku University
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Details 詳細情報について
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- CRID
- 1390001205119078016
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- NII Article ID
- 110006691412
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- NII Book ID
- AA00863953
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- ISSN
- 2186585X
- 00408735
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- HANDLE
- 10097/00106047
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- MRID
- 2428865
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- Text Lang
- en
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- Article Type
- departmental bulletin paper
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- Data Source
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- JaLC
- IRDB
- Crossref
- CiNii Articles
- KAKEN
- OpenAIRE
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- Abstract License Flag
- Disallowed