Full cones swept out by minimal rational curves on irreducible Hermitian symmetric spaces as examples of varieties underlying geometric substructures

@inproceedings{Mok2018FullCS,
  title={Full cones swept out by minimal rational curves on irreducible Hermitian symmetric spaces as examples of varieties underlying geometric substructures},
  author={Ngaiming Mok},
  year={2018}
}
  • N. Mok
  • Published 2018
  • Mathematics
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References

SHOWING 1-10 OF 25 REFERENCES
Mori geometry meets Cartan geometry: Varieties of minimal rational tangents
We give an introduction to the theory of varieties of minimal rational tangents, emphasizing its aspect as a fusion of algebraic geometry and differential geometry, more specifically, a fusion of
Metric Rigidity Theorems On Hermitian Locally Symmetric Manifolds
This monograph studies the problem of characterizing canonical metrics on Hermitian locally symmetric manifolds X of non-compact/compact types in terms of curvature conditions. The proofs of these
Lie Algebra Cohomology and Generalized Schubert Cells
This paper is referred to as Part II. Part I is [4], The numerical I used as a reference will refer to that paper. A third and final part, Clifford algebras and the intersection of Schubert cycles is
Geometry of varieties of minimal rational tangents
We present the theory of varieties of minimal rational tangents (VMRT), with an emphasis on its own structural aspect, rather than applications to concrete problems in algebraic geometry. Our point
Characterization of Standard Embeddings between Rational Homogeneous Manifolds of Picard Number 1
Let X be a rational homogeneous manifold of Picard number 1. A subdiagram of the marked Dynkin diagram of X induces naturally an embedding of a rational homogeneous manifold Z into X. By a standard
Rigid Schubert varieties in compact Hermitian symmetric spaces
Given a singular Schubert variety Xw in a compact Hermitian symmetric space X, it is a long-standing question to determine when Xw is homologous to a smooth variety Y. We identify those Schubert
Geometric structures on uniruled projective manifolds defined by their varieties of minimal rational tangents
— In a joint research programme with Jun-Muk Hwang we have been investigating geometric structures on uniruled projective manifolds, especially Fano manifolds of Picard number 1, defined by varieties
Schur flexibility of cominuscule Schubert varieties
Let X=G/P be cominuscule rational homogeneous variety. (Equivalently, X admits the structure of a compact Hermitian symmetric space.) We say a Schubert class [S] is Schur rigid if the only
Rigidity of pairs of rational homogeneous spaces of Picard number $1$ and analytic continuation of geometric substructures on uniruled projective manifolds
Building on the geometric theory of uniruled projective manifolds by Hwang-Mok, which relies on the study of varieties of minimal rational tangents (VMRTs) from both the algebro-geometric and the
Rigidity of irreducible Hermitian symmetric spaces of the compact type under Kähler deformation
We study deformations of irreducible Hermitian symmetric spaces $S$ of the compact type, known to be locally rigid, as projective-algberaic manifolds and prove that no jump of complex structures can
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