On strategies for selection games related to countable dimension

Abstract

Two selection games from the literature, Gc( O, O) and G1( Ozd, O), are known to characterize countable dimension among certain spaces. This paper studies their perfect- and limited-information strategies, and investigates issues related to non-equivalent characterizations of zero-dimensionality for spaces that are not both separable and metrizable. To relate results on zero-dimensional and finite-dimensional spaces, a generalization of Telg\'arsky's proof that the point-open and finite-open games are equivalent is demonstrated.

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