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Behaviour of holomorphic automorphisms on equicontinuous subsets of the space

Authors:	J M Isidro

Institution:	Departamento de Análisis Matemático, Facultad de Matemáticas, Universidad de Santiago, Santiago de Compostela, Spain

Abstract:	Consider a compact Hausdorff topological space $\Omega$ , a $\text{JB}^{\ast }$ -triple and $F: = {\mathcal{C}}(\Omega , \, E)$ , the $\text{JB}^{\ast }$ -triple of all continuous -valued functions $f\colon \Omega \to E$ with the pointwise operations and the norm of the supremum. Let ${\mathsf{G}}$ be the group of all holomorphic automorphisms of the unit ball $B_{F}$ of that map every equicontinuous subset lying strictly inside $B_{F}$ into another such a set. The real Banach-Lie group ${\mathsf{G}}$ and its Lie algebra are investigated. The identity connected component of ${\mathsf{G}}$ is identified when has the strong Banach-Stone property. This extends to the infinite dimensional setting a well known result concerning the case $E={\mathbb{C}}$ .

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