Abstract
Given a holomorphic self-map $\varphi$ of the ball of $\mathbb{C}^N$, we study whether there exists a map $\sigma$ and a linear fractional transformation $A$ such that $\sigma\circ\varphi=A\circ\sigma$. This is an important result when $N=1$ with a great number of applications. We extend this result to the multi-dimensional setting for a large class of maps. Applications to commuting holomorphic self-maps are given.
Citation
Frédéric Bayart . "The linear fractional model on the ball." Rev. Mat. Iberoamericana 24 (3) 765 - 824, November, 2008.
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