Evasion numbers via zero-prediction
Abstract: Cruz Chapital, Goto, Hayashi and the author showed that the game-theoretic variants $\mathfrak{s}{\mathrm{game}*}\mathrm{I}$ and $\mathfrak{s}{\mathrm{game}{**}}\mathrm{I}$ of the splitting number $\mathfrak{s}$ are consistently different, although the corresponding two games differ only in a minor case. This result suggests that even if two relational systems $\mathbf{R}=\langle X,Y,\sqsubset\rangle$, $\mathbf{R}\prime=\langle X,Y,\sqsubset\prime\rangle$ are the same modulo a countable set $C\subseteq X$, the associated cardinal invariants might be different. We study this phenomenon for the standard relational system of evasion and prediction and for a variation of it. We show that such a difference occurs for the standard one, but not for the variation.
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