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shanex
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Measurability of a particular set generated by discrete probability measures
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Measurability of a particular set generated by discrete probability measures
Thanks very much. But wouldn't $\{x:\Sigma_{i=1}^{\infty} F_n(x) = 1\}$ contain tuples $x$ having entries that could repeat only finitely often? No tuple in any $F_P$ has this property.
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Measurability of a particular set generated by discrete probability measures
@Anthony Quas: Thanks, I edited the question to capture that detail.
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Measurability of a particular set generated by discrete probability measures
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Measurability of a particular set generated by discrete probability measures
@Anthony Quas: by all I mean those discrete $P$ having finite or countably many distinct point masses.
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Measurability of a particular set generated by discrete probability measures
@Anthony Quas: $P_n \rightarrow P$ setwise means that $P_n(A) \rightarrow P(A)$ for all $A \in \Sigma$.
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Measurability of a particular set generated by discrete probability measures
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Measurability of a particular set generated by discrete probability measures