Phase-isometries on the unit sphere of C(K)

Abstract

We say that a map T: SX→ SY between the unit spheres of two real normed-spaces X and Y is a phase-isometry if it satisfies eqnarray* \\|T(x)+T(y)\|, \|T(x)-T(y)\|\=\\|x+y\|, \|x-y\|\ eqnarray* for all x,y∈ SX. In the present paper, we show that there is a phase function :SX→ \-1,1\ such that · T is an isometry which can be extended a linear isometry on the whole space X whenever T is surjective, X=C(K) (K is a compact Hausdorff space) and Y is an arbitrary Banach space. Additionally, if T is a phase-isometry between the unit spheres of C(K) and C(), where K and are compact Hausdorff spaces, we prove that there is a homeomorphism : → K such that T(f)∈\f ,-f \ for all f∈ SC(K). This also can be seen as a Banach-Stone type representation for phase-isometries in C(K) spaces.