An Amir-Cambern theorem for subspaces of Banach lattice-valued continuous functions
Abstract
For i=1,2, let Ei be a reflexive Banach lattice over R with a certain parameter λ+(Ei)>1, 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) such that T and T-1 preserve positivity, then ChH1 K1 is homeomorphic to ChH2 K2.
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