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Is the measurable space $(\omega_1,\mathcal{P}(\omega_1))$ separable?

Here $\omega_1$ is the first uncountable ordinal, and $\mathcal{P}(\omega_1)$ denotes the power set of $\omega_1$. Separable means countably generated as a $\sigma$-algebra.

set-theory
measure-theory
posets
ordinal-numbers

Héctor

asked Jun 14, 2018 at 15:53

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