On isomorphisms of C(K) spaces and cardinal invariants of derivatives of K

Abstract

We present a necessary condition for a pair of C(K) spaces to be isomorphic in terms of topological properties of Cantor-Bendixon derivatives of K. This in particular gives a completely new information about the perfect kernels of such K. In the process, we extend known lower estimates of the Banach-Mazur distance between a pair of spaces of continuous functions from the case of scattered compact spaces to a more general setting. Next, we apply this general result to deduce some new information about isomorphisms of spaces of continuous functions over Eberlein compacta of height ω+1. Further, we show that isomorphisms of C(K) spaces preserve the spread of K, and we also prove some new results for pairs of spaces of continuous functions whose Banach-Mazur distance is less than 3.