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@ -4168,7 +4168,7 @@ This result can be composed with soundness of any Hoare logic for the source lan
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The associated Coq code defines one, essentially following our separation logic\index{separation logic} from last chapter.
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\begin{theorem}
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If $\hoare{P}{c}{Q}$, $P(h)$, $\dscomp{v}{c}{s}$, and $\texttt{result} \notin \dom{v}$, then it is invariant of the transition system starting in $(h, v, s)$ that execution never gets stuck.
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If $\hoare{P}{c}{Q}$, $P(h)$, $\dscomp{v}{c}{s}$, and $\texttt{result} \notin \dom{v}$, then it is an invariant of the transition system starting in $(h, v, s)$ that execution never gets stuck.
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\end{theorem}
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\begin{proof}
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First, we switch to proving an invariant of the system $(h, c)$ using the simulation from Theorem \ref{dscompsim}.
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