Countable tightness in the spaces of regular probability measures
Abstract
We prove that if K is a compact space and the space P(K× K) of regular probability measures on K× K has countable tightness in its weak* topology, then L1(μ) is separable for every μ∈ P(K). It has been known that such a result is a consequence of Martin's axiom MA(ω1). Our theorem has several consequences; in particular, it generalizes a theorem due to Bourgain and Todorcevi\'c on measures on Rosenthal compacta.
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