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Presents many major differential geometric acheivements in the theory of CR manifolds for the first time in book form
Explains how certain results from analysis are employed in CR geometry
Many examples and explicitly worked-out proofs of main geometric results in the first section of the book making it suitable as a graduate main course or seminar textbook
Provides unproved statements and comments inspiring further study
CR Manifolds.- The Fefferman Metric.- The CR Yamabe Problem.- Pseudoharmonic Maps.- Pseudo-Einsteinian Manifolds.- Pseudo-Hermitian Immersions.- Quasiconformal Mappings.- Yang-Mills Fields on CR Manifolds.- Spectral Geometry.In fact, it will be invaluable for people working on the differential geometry of CR manifolds. Thomas Garity, MathSciNet
The study of CR manifolds lies at the intersection of three main mathematical disciplines: partial differential equations, complex analysis in several complex variables, and differential geometry. While the PDE and complex analytic aspects have been intensely studied in the last fifty years, much effort has recently been made to understand the differential geometric side of the subject.
This monograph provides a unified presentation of several differential geometric aspects in the theory of CR manifolds and tangential CauchyRiemann equations. It presents the major differential geometric acheivements in the theory of CR manifolds, such as the TanakaWebster connection, Fefferman's metric, pseudo-Einstein structures and the Lee conjecture, CR immersions, subelliptic harmonic maps as a local manifestation of pseudoharmonic maps from a CR manifold, YangMills fields on CR manifolds, to name a few. It also aims at explaining how certain results from analysis are employed in CR geometry.
Motivated by clear exposition, many examples, l³
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