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8
3
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A subset of $\mathbb{R}^n$ is
This process gives rise to the Borel hierarchy. Since all closed sets are $G_\delta$, all $F_\sigma$ are $G_{\delta\sigma}$. What is an explicit example of a $G_{\delta\sigma}$ that is not $F_\sigma$? |
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5
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Any dense $G_{\delta}$ with empty interior is of II Baire category, and cannot be $F_\sigma$ by the Baire theorem (and of course it is in particular a $G_{\delta\sigma}$). |
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12
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You want a $\Sigma^0_3$ set which is not $\Pi^0_3$. The canonical answer is a "universal $\Sigma^0_3$ set". You can find these concepts in books on Descriptive Set Theory (such as the one by Moschovakis or the one by Kechris). A specific example: Let $N_{10}$ be the set of normal numbers (each digit appears with the right asymptotic frequency in the decimal expansion). Then $N_{10}$ is a $\Pi^0_3$ set which as complicated as $\Pi^0_3$ sets get (in particular: every $\Pi^0_3$ set is a continuous preimage of it). In particular, it is not $\Sigma^0_3$. So the complement of $N_{10}$ is what you want. References:
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3
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Here are some examples from recursion theory which are boldface $\mathbf{\Pi^0_3}$ (the first is $\Pi^0_3(\emptyset')$ and the others are lightface $\Pi^0_3$) but not boldface $\mathbf{\Sigma^0_3}$: The collection of weakly-2-random reals; The collection of Schnorr random reals; The collection of computably random reals. References:
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