Lajos Molnar, M. Gyory
Published 1997-11-26Version 1
The aim of this paper is to show that the automorphism and isometry groups of the suspension of $B(H)$, $H$ being a separable infinite dimensional Hilbert space, are algebraically reflexive. This means that every local automorphism, respectively local surjective isometry of $C_0(\mathbb R)\otimes B(H)$ is an automorphism, respectively a surjective isometry.
The automorphism and isometry groups of $l_\infty(N, B(H))$ are topologically reflexive
On the reflexivity of $\mathcal{P}_{w}(^{n}E;F)$
Factorization and Reflexivity on Fock spaces
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