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A boundary Schwarz Lemma for holomorphic mappings between unit balls of different dimensions
Published 3 Nov 2014 in math.CV | (1411.0600v3)
Abstract: In this paper, we give a general boundary Schwarz lemma for holomorphic mappings between unit balls in any dimensions. It is proved that if the mapping $f\in C{1+\alpha}$ at $z_0\in \partial \mathbb Bn$ with $f(z_0)=w_0\in \partial \mathbb BN$ for any $n,N\geq 1$, then the Jacobian matrix $J_f(z_0)$ maps the tangent space $T_{z_0}(\partial \mathbb Bn)$ to $T_{w_0}(\partial \mathbb BN)$, and the holomorphic tangent space $T{(1,0)}_{z_0}(\partial \mathbb Bn)$ to $T{(1,0)}_{w_0}(\partial \mathbb BN)$ as well.
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