CR embedded submanifolds of CR manifolds
著者
書誌事項
CR embedded submanifolds of CR manifolds
(Memoirs of the American Mathematical Society, no.1241)
American Mathematical Society, 2019
- タイトル別名
-
Cauchy-Riemann embedded submanifolds of Cauchy-Riemann manifolds
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注記
Includes bibliographical references
"March 2019, volume 258, number 1241 (fifth of 7 numbers)"
内容説明・目次
内容説明
The authors develop a complete local theory for CR embedded submanifolds of CR manifolds in a way which parallels the Ricci calculus for Riemannian submanifold theory. They define a normal tractor bundle in the ambient standard tractor bundle along the submanifold and show that the orthogonal complement of this bundle is not canonically isomorphic to the standard tractor bundle of the submanifold. By determining the subtle relationship between submanifold and ambient CR density bundles the authors are able to invariantly relate these two tractor bundles, and hence to invariantly relate the normal Cartan connections of the submanifold and ambient manifold by a tractor analogue of the Gauss formula. This also leads to CR analogues of the Gauss, Codazzi, and Ricci equations. The tractor Gauss formula includes two basic invariants of a CR embedding which, along with the submanifold and ambient curvatures, capture the jet data of the structure of a CR embedding. These objects therefore form the basic building blocks for the construction of local invariants of the embedding. From this basis the authors develop a broad calculus for the construction of the invariants and invariant differential operators of CR embedded submanifolds.
The CR invariant tractor calculus of CR embeddings is developed concretely in terms of the Tanaka-Webster calculus of an arbitrary (suitably adapted) ambient contact form. This enables straightforward and explicit calculation of the pseudohermitian invariants of the embedding which are also CR invariant. These are extremely difficult to find and compute by more naive methods. The authors conclude by establishing a CR analogue of the classical Bonnet theorem in Riemannian submanifold theory.
目次
Introduction
Weighted Tanaka-Webster Calculus
CR Tractor Calculus
CR Embedded Submanifolds and Contact Forms
CR Embedded Submanifolds and Tractors
Higher Codimension Embeddings
Invariants of CR Embedded Submanifolds
A CR Bonnet Theorem
Bibliography.
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