Pierre's printing
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report.tex
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report.tex
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@ -578,10 +578,21 @@ no longer valid when adding a consistency set.}
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\begin{definition}[Compositional interaction]
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Given two strategies $\sigma : A^\perp \parallel B$ and $\tau : B^\perp
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\parallel C$, their \emph{compositional interaction} $\tau \strInteract
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\sigma$ is defined as $(\sigma \parallel \id_C) \wedge (\id_A \parallel
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\tau)$. \qtodo{Tell me more?}
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\sigma$ is an event structure defined as $(\sigma \parallel \id_C) \wedge
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(\id_{A^\perp} \parallel \tau)$, where $\id_A$ is exactly the game $A$ seen
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as a strategy.
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\end{definition}
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The idea is to put in correspondence the ``middle'' states (those of $B$) while
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adding ``neutral'' states for $A$ and $C$.
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$\tau \strInteract \sigma$ is an \emph{event structure} (\ie, without
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polarities): indeed, the two strategies disagree on the polarities of the
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middle part. \qtodo{Tell me more?}
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\note{Fin de la partie refaite.}
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\begin{definition}[Strategies composition]
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\end{definition}
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