CR-manifolds of infinite type in the sense of Bloom and Graham

Q2 Mathematics
M. Stepanova
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引用次数: 3

Abstract

An analogue of the Bloom–Graham theorem for germs of real analytic CR-manifolds of infinite type is devised, and a certain standard form to which they can be transformed (a reduced form) is described. The concept of Bloom–Graham type is refined (as a stratified type). The refined type is also holomorphically invariant. The concept of a quasimodel surface is introduced and it is shown that for biholomorphically equivalent manifolds such surfaces are quasilinearly equivalent. A criterion for the Lie algebra of infinitesimal holomorphic automorphisms to be finite-dimensional is obtained in the case when the type is uniformly infinite (that is, infinite at all points). In combination with the criterion of a finite-dimensional automorphism algebra for manifolds of finite type almost everywhere, this yields a complete criterion for this algebra to be finite-dimensional. The sets of fixed Blooom–Graham type are shown to be semi-analytic and the type of a generic point (lying outside a proper analytic subset) is minimal in a certain sense.
布鲁姆和格雷厄姆意义上的无限型cr流形
设计了无限型实解析CR流形芽的Bloom–Graham定理的一个类似物,并描述了它们可以转换为的某种标准形式(一种简化形式)。Bloom–Graham类型的概念得到了改进(作为一种分层类型)。精化类型也是全纯不变的。引入了拟模型曲面的概念,证明了对于双全纯等价流形,这种曲面是拟线性等价的。在类型一致无穷大(即所有点都无穷大)的情况下,得到了无穷小全纯自同构的李代数是有限维的一个判据。结合有限维自同构代数对几乎处处有限型流形的判据,这给出了该代数是有限维的一个完整判据。固定Blooom-Graham类型的集合被证明是半解析的,并且一般点的类型(位于适当的解析子集之外)在某种意义上是最小的。
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来源期刊
Transactions of the Moscow Mathematical Society
Transactions of the Moscow Mathematical Society Mathematics-Mathematics (miscellaneous)
自引率
0.00%
发文量
19
期刊介绍: This journal, a translation of Trudy Moskovskogo Matematicheskogo Obshchestva, contains the results of original research in pure mathematics.
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