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The interplay between the CR “flatness condition” and existence results for the prescribed Webster scalar curvature
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Published/Copyright:
August 1, 2012
Abstract.
In this paper, we obtain existence result for prescribed curvature satisfying a CR “flatness condition” by using topological methods results: the theory of critical points at infinity.
Keywords: Webster scalar curvature; critical point at infinity; gradient flow; Morse index; topological methods
Received: 2011-12-01
Revised: 2012-06-01
Accepted: 2012-06-01
Published Online: 2012-08-01
Published in Print: 2012-08-01
© 2012 by Walter de Gruyter Berlin Boston
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Articles in the same Issue
- Masthead
- Analytic properties of the Hasse–Weil L-function
- A note on absolute Cesàro summability factors
- Analogues to some uncertainty principles on certain solvable Lie groups
- The interplay between the CR “flatness condition” and existence results for the prescribed Webster scalar curvature
- On generalized Gajda's functional equation of D'Alembert type
- Two basic boundary-value problems for the inhomogeneous Cauchy–Riemann equation in an infinite sector
- Joint dilation scaling sets on the reducing subspaces
Keywords for this article
Webster scalar curvature;
critical point at infinity;
gradient flow;
Morse index;
topological methods
Articles in the same Issue
- Masthead
- Analytic properties of the Hasse–Weil L-function
- A note on absolute Cesàro summability factors
- Analogues to some uncertainty principles on certain solvable Lie groups
- The interplay between the CR “flatness condition” and existence results for the prescribed Webster scalar curvature
- On generalized Gajda's functional equation of D'Alembert type
- Two basic boundary-value problems for the inhomogeneous Cauchy–Riemann equation in an infinite sector
- Joint dilation scaling sets on the reducing subspaces
