On the analytic and geometric aspects of obstruction flatness
Abstract
In this paper, we investigate analytic and geometric properties of obstruction flatness of strongly pseudoconvex CR hypersurfaces of dimension 2n-1. Our first two results concern local aspects. Theorem 3.2 asserts that any strongly pseudoconvex CR hypersurface M⊂ Cn can be osculated at a given point p∈ M by an obstruction flat one up to order 2n+4 generally and 2n+5 if and only if p is an obstruction flat point. In Theorem 4.1, we show that locally there are non-spherical but obstruction flat CR hypersurfaces with transverse symmetry for n=2. The final main result in this paper concerns the existence of obstruction flat points on compact, strongly pseudoconvex, 3-dimensional CR hypersurfaces. Theorem 5.1 asserts that the unit sphere in a negative line bundle over a Riemann surface X always has at least one circle of obstruction flat points.
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