A New Approach to the Local Embedding Theorem of CR-structures for N [greater Than or Equal To] 4 (the Local Solvability for the Operator [overbarred Partial] B in the Abstract Sense)Book - 1987
This book is aimed at researchers in complex analysis, several complex variables, or partial differential equations. Kuranishi proved that any abstract strongly pseudo convex CR-structure of real dimension $\geq 9$ can be locally embedded in a complex euclidean space. For the case of real dimension $=3$, there is the famous Nirenberg counter example, but the cases of real dimension $=5$ or 7 were left open. The author of this book establishes the result for real dimension $=7$ and, at the same time, presents a new approach to Kuranishi's result.
Publisher: Providence, R.I. : American Mathematical Society, 1987
Branch Call Number: QA331 .A475 1987
Characteristics: xv, 257 p. ; 26 cm
Uniform Title: Local embedding theorem of CR-structures