A new gap phenomenon for proper holomorphic mappings from Bn into BN
Abstract
In this paper (Math. Res. Lett. 13 (2006). No 4, 509-523), the authors established a pseudo-normal form for proper holomoprhic mappings between balls in complex spaces with degenerate rank. This then was used to give a complete characterization for all proper holomorphic maps with geometric rank one, which, in particular, includes the following as an immediate application: Theorem: Any rational holomorphic map from Bn into BN with 4 n N 3n-4 is equivalent to the D'Angelo map Fθ(z',w)=(z',(θ)w,(θ)z1w, ..., (θ)zn-1w, (θ)w2, 0'), 0 θ≤ π/2. It is a well-known (but also quite trivial) fact that any non-constant rational CR map from a piece of the sphere ∂ Bn into the sphere ∂ BN can be extended as a proper rational holomoprhic map from Bn into BN (N n 2). By using the rationality theorem that the authors established in [HJX05], one sees that the the above theorem (and also the main theorem of the paper) holds in the same way for any non-constant C3-smooth CR map from a piece of ∂ Bn into ∂BN. The paper [Math. Res. Lett. 13 (2006). No 4, 509-523] was first electronically published by Mathematical Research Letters several months ago at its home website: http://www.mrlonline.org/mrl/0000-000-00/Huang-Ji-Xu2.pdf. (The pdf file of the printed journal version can also be downloaded at http://www.math.uh.edu/~shanyuji/rank1.pdf).
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