On isomorphisms of Banach spaces of continuous functions
Abstract
We prove that if K and L are compact spaces and C(K) and C(L) are isomorphic as Banach spaces then K has a π-base consisting of open sets U such that U is a continuous image of some compact subspace of L. This gives some information on isomorphic classes of the spaces of the form C([0,1]) and C(K) where K is Corson compact.
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