Phase-isometries between the positive cones of the Banach space of continuous real-valued functions

Abstract

For a locally compact Hausdorff space L, we denote by C0(L,R) the Banach space of all continuous real-valued functions on L vanishing at infinity equipped with the supremum norm. We prove that every surjective phase-isometry T C0+(X,R) C0+(Y,R) between the positive cones of C0(X,R) and C0(Y,R) is a composition operator induced by a homeomorphism between X and Y. Furthermore, we show that any surjective phase-isometry T C0+(X,R) C0+(Y,R) extends to a surjective linear isometry from C0(X,R) onto C0(Y,R).

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