On a variant of Tingley's problem for some function spaces

Abstract

Let (, A, μ) and (, B, ) be two arbitrary measure spaces, and p∈ [1,∞]. Set Lp(μ)+sp:= \f∈ Lp(μ): \|f\|p =1; f≥ 0\ μ-a.e. \ i.e., the positive part of the unit sphere of Lp(μ). We show that every metric preserving bijection : Lp(μ)+sp Lp()+sp can be extended (necessarily uniquely) to an isometric order isomorphism from Lp(μ) onto Lp(). A Lamperti form, i.e., a weighted composition like form, of is provided, when (, B, ) is localizable (in particular, when it is σ-finite). On the other hand, we show that for compact Hausdorff spaces X and Y, if is a metric preserving bijection from the positive part of the unit sphere of C(X) to that of C(Y), then there is a homeomorphism τ:Y X satisfying (f)(y) = f(τ(y)) (f∈ C(X)+sp; y∈ Y).