Rigidity of pairs of rational homogeneous spaces of Picard number $1$ and analytic continuation of geometric substructures on uniruled projective manifolds

IF 1.3 1区 数学 Q1 MATHEMATICS Journal of Differential Geometry Pub Date : 2019-06-01 DOI:10.4310/JDG/1559786425
N. Mok, Yunxin Zhang
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引用次数: 12

Abstract

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 differential-geometric perspectives, Mok, Hong-Mok and Hong-Park have studied standard embeddings between rational homogeneous spaces X = G/P of Picard number 1. Denoting by S ⊂ X an arbitrary germ of complex submanifold which inherits from X a geometric structure defined by taking intersections of VMRTs with tangent subspaces and modeled on some rational homogeneous space X0 = G0/P0 of Picard number 1 embedded in X = G/P as a linear section through a standard embedding, we say that (X0, X) is rigid if there always exists some γ ∈ Aut(X) such that S is an open subset of γ(X0). We prove that a pair (X0, X) of sub-diagram type is rigid whenever X0 is nonlinear, which in the Hermitian symmetric case recovers Schubert rigidity for nonlinear smooth Schubert cycles, and which in the general rational homogeneous case goes beyond earlier works dealing with images of holomorphic maps. Our methods apply to uniruled projective manifolds (X,K), for which we introduce a general notion of sub-VMRT structures π : C (S) → S, proving that they are rationally saturated under an auxiliary condition on the intersection C (S) := C (X) ∩ PT (S) and a nondegeneracy condition for substructures expressed in terms of second fundamental forms on VMRTs. Under the additional hypothesis that minimal rational curves are of degree 1 and that distributions spanned by sub-VMRTs are bracket generating, we prove that S extends to a subvariety Z ⊂ X. For its proof, starting with a “Thickening Lemma ” which yields smooth collars around certain standard rational curves, we show that the germ of submanifold (S;x0) and hence the associated germ of sub-VMRT structure on (S;x0) can be propagated along chains of “thickening ” curves issuing from x0, and construct by analytic continuation a projective family of chains of rational curves compactifying the latter family, thereby constructing the projective completion Z of S as its image under
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无规射影流形上Picard数$1的有理齐次空间对的刚性及几何子结构的解析延拓
基于Hwang-Mok的无规射影流形的几何理论,该理论依赖于从代数几何和微分几何角度对极小有理切线(VMRTs)的变化的研究,Mok、Hong-Mok和Hong-Park研究了Picard数1的有理齐次空间X = G/P之间的标准嵌入。用S∧X表示一个复子流形的任意子形,它从X继承了一个几何结构,该几何结构是由vmrt与切子空间的相交定义的,并通过标准嵌入在X = G/P中的Picard数1的有理齐次空间X0 = G0/P0上建模为线性截面,如果总存在某些γ∈Aut(X)使得S是γ(X0)的开子集,则我们说(X0, X)是刚性的。我们证明了子图型对(X0, X)在X0为非线性时是刚性的,它在厄米对称情况下恢复了非线性光滑舒伯特循环的舒伯特刚性,并且在一般理性齐次情况下超越了先前处理全纯映射像的工作。我们的方法应用于无规投影流形(X,K),为此我们引入了子vmrt结构π: C (S)→S的一般概念,证明了它们在相交C (S):= C (X)∩PT (S)的辅助条件下是合理饱和的,并证明了在vmrt上用第二基本形式表示的子结构的非简并性条件。在最小有理曲线为1次且由子vmrt张成的分布为夹角生成的附加假设下,我们证明S扩展到子变种Z∧x。为了证明它,我们从在某些标准有理曲线周围产生光滑项圈的“增厚引理”出发,证明子流形(S;x0)的子嗣以及(S;x0)上的子vmrt结构的相关子嗣可以沿着由x0发出的“增厚”曲线链传播。并通过解析延拓构造紧化后一族的有理曲线链的射影族,从而构造S的射影补全Z作为其像
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来源期刊
CiteScore
3.40
自引率
0.00%
发文量
24
审稿时长
>12 weeks
期刊介绍: Publishes the latest research in differential geometry and related areas of differential equations, mathematical physics, algebraic geometry, and geometric topology.
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