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Nate Eldredge
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There are two metric Baire spaces, whose product is not Baire; a counterexample is given in the slides An absolute barely Baire space, L.F. Aurichi and G.A.A. Medina, 2020. We present KunenFleissner and FleisnerKunen's proof with applications of Clubs and stationary sets in $\omega_{1}$.

Fleissner, W. G.; Kunen, K., Barely Baire spaces, Fundam. Math. 101, 229-240 (1978). ZBL0413.54036.

There are two metric Baire spaces, whose product is not Baire; a counterexample is given in the slides An absolute barely Baire space, L.F. Aurichi and G.A.A. Medina, 2020. We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

There are two metric Baire spaces, whose product is not Baire; a counterexample is given in the slides An absolute barely Baire space, L.F. Aurichi and G.A.A. Medina, 2020. We present Fleissner and Kunen's proof with applications of Clubs and stationary sets in $\omega_{1}$.

Fleissner, W. G.; Kunen, K., Barely Baire spaces, Fundam. Math. 101, 229-240 (1978). ZBL0413.54036.

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There are two metric Baire spaces, whose product is not BaireBaire; a counterexample is given in the slides (counterexampleAn absolute barely Baire space), L.F. Aurichi and G.A.A. Medina, 2020. We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

There are two metric Baire spaces, whose product is not Baire (counterexample). We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

There are two metric Baire spaces, whose product is not Baire; a counterexample is given in the slides An absolute barely Baire space, L.F. Aurichi and G.A.A. Medina, 2020. We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

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There are two metric Baire spaces, whose product is not Baire (counterexamplecounterexample). We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

There are two metric Baire spaces, whose product is not Baire (counterexample). We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

There are two metric Baire spaces, whose product is not Baire (counterexample). We present Kunen and Fleisner proof with applications of Clubs and stationary sets in $\omega_{1}$.

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