高余维双射流确定陈-莫泽定理反例的构造

Pub Date : 2020-10-20 DOI:10.4310/mrl.2022.v29.n2.a4

Jan Gregorovivc, F. Meylan

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引用次数: 7

摘要

我们首先在$\Bbb C^9$中构造了一个余维数为$5$的一般二次子流形的反例，它允许一个具有4次齐次多项式系数的实解析无穷小CR自同构。这个例子还解决了Tanaka延拓理论中一个开放了50多年的问题。然后，我们给出了在较高余维上生成更多反例的充分条件，以证明$2-$jet判定Chern-Moser定理。特别地，我们构造了具有任意高阶喷射判定的一般二次子流形的例子。

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Construction of counterexamples to the 2–jet determination Chern–Moser Theorem in higher codimension

We first construct a counterexample of a generic quadratic submanifold of codimension $5$ in $\Bbb C^9$ which admits a real analytic infinitesimal CR automorphism with homogeneous polynomial coefficients of degree $4.$ This example also resolves a question in the Tanaka prolongation theory that was open for more than 50 years. Then we give sufficient conditions to generate more counterexamples to the $2-$jet determination Chern-Moser Theorem in higher codimension. In particular, we construct examples of generic quadratic submanifolds with jet determination of arbitrarily high order.

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