Alexander Koldobsky
Published 1992-12-04Version 1
Let $E$ be a real Banach space. For $x,y \in E,$ we follow R.James in saying that $x$ is orthogonal to $y$ if $\|x+\alpha y\|\geq \|x\|$ for every $\alpha \in R$. We prove that every operator from $E$ into itself preserving orthogonality is an isometry multiplied by a constant.
The group of isometries of a Banach space and duality
Invariant subspaces of $RL^1$
On the infimum of certain functionals
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