Linear orthogonality preservers between function spaces associated with commutative JB*-triples

Abstract

It is known, by Gelfand theory, that every commutative JB*-triple admits a representation as a space of continuous functions of the form C0T(L) = \ a∈ C0(L) : a(λ t ) = λ a(t), \ ∀ λ∈ T, t∈ L\, where L is a principal T-bundle and T denotes the unit circle in C. We provide a description of all orthogonality preserving (non-necessarily continuous) linear maps between commutative JB*-triples. We show that each linear orthogonality preserver T: C0T (L1) C0T (L2) decomposes in three main parts on its image, on the first part as a positive-weighted composition operator, on the second part the points in L2 where the image of T vanishes, and a third part formed by those points s in L2 such that the evaluation mapping δs T is non-continuous. Among the consequences of this representation, we obtain that every linear bijection preserving orthogonality between commutative JB*-triples is automatically continuous and biorthogonality preserving.

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