In unital JB*-algebras, an extreme point u of the closed unit ball is unitary if and only if the set of extreme points e with ||u ± e|| ≤ √2 contains an isolated point.
Mankiewicz's theorem and the Mazur--Ulam property for C*-algebras
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abstract
We prove that every unital C*-algebra $A$ has the Mazur--Ulam property. Namely, every surjective isometry from the unit sphere $S_A$ of $A$ onto the unit sphere $S_Y$ of another normed space $Y$ extends to a real linear map. This extends the result of A. M. Peralta and F. J. Fernandez-Polo who have proved the same under the additional assumption that both $A$ and $Y$ are von Neumann algebras. In the course of the proof, we strengthen Mankiewicz's theorem and prove that every surjective isometry from a closed unit ball with enough extreme points onto an arbitrary convex subset of a normed space is necessarily affine.
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math.OA 1years
2019 1verdicts
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Metric characterisation of unitaries in JB$^*$-algebras
In unital JB*-algebras, an extreme point u of the closed unit ball is unitary if and only if the set of extreme points e with ||u ± e|| ≤ √2 contains an isolated point.