Isomorphisms of subspaces of vector-valued continuous functions

Abstract

We deal with isomorphic Banach-Stone type theorems for closed subspaces of vector-valued continuous functions. Let F=R or C. For i=1,2, let Ei be a reflexive Banach space over F with a certain parameter λ(Ei)>1, which in the real case coincides with the Schaffer constant of Ei, let Ki be a locally compact (Hausdorff) topological space and let Hi be a closed subspace of C0(Ki, Ei) such that each point of the Choquet boundary ChHi Ki of Hi is a weak peak point. We show that if there exists an isomorphism T:H1 → H2 with T · T-1 < λ(E1), λ(E2) , then ChH1 K1 is homeomorphic to ChH2 K2. Next we provide an analogous version of the weak vector-valued Banach-Stone theorem for subspaces, where the target spaces do not contain an isomorphic copy of c0.