A characterization of symplectic Grassmannians
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Publication:2406030
DOI10.1007/s00209-016-1807-6zbMath1388.14123arXiv1604.06867OpenAlexW2963415254MaRDI QIDQ2406030
Gianluca Occhetta, Kiwamu Watanabe, Luis-Eduardo Solá-Conde
Publication date: 26 September 2017
Published in: Mathematische Zeitschrift (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1604.06867
Homogeneous spaces and generalizations (14M17) Grassmannians, Schubert varieties, flag manifolds (14M15) Fano varieties (14J45) Minimal model program (Mori theory, extremal rays) (14E30)
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AN INVARIANT FOR EMBEDDED FANO MANIFOLDS COVERED BY LINEAR SPACES, Characterizing symplectic Grassmannians by varieties of minimal rational tangents
Cites Work
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- Flag bundles on Fano manifolds
- On covering and quasi-unsplit families of curves
- Birationality of the tangent map for minimal rational curves
- Are minimal degree rational curves determined by their tangent vectors?
- Rational curves of minimal degree and characterizations of projective spaces
- Geometric Structures and Substructures on Uniruled Projective Manifolds
- A survey on the Campana-Peternell Conjecture
- Polarized minimal families of rational curves and higher Fano manifolds
- Nondeformability of the complex projective space.
- Families of singular rational curves
- On the degrees of Fano four-folds of Picard number 1
- FANO MANIFOLDS, CONTACT STRUCTURES, AND QUATERNIONIC GEOMETRY
- Fano manifolds whose elementary contractions are smooth P^1-fibrations: a geometric characterization of flag varieties
- Mori geometry meets Cartan geometry: Varieties of minimal rational tangents
- Higher-dimensional algebraic geometry
