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@ -1341,9 +1341,57 @@ $\Control$ has the same dynamic behaviour as $\FelleisenF$. |
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It is evident from the \slab{Resume} rule that control and prompt are |
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an instance of a dynamic control operator, because resuming the |
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continuation object produced by $\Control$ does not insert a new |
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continuation object produced by $\Control$ does not install a new |
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prompt. |
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To illustrate $\Prompt$ and $\Control$ in action, let us consider a |
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few simple examples. |
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\begin{derivation} |
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& 1 + \Prompt~2 + \Control\,(\lambda k.\Continue~k~(\Continue~k~0))\\ |
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\reducesto^+& \reason{Capture $\EC = 2 + [\,]$}\\ |
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& 1 + \Prompt~(\lambda k.\Continue~k~(\Continue~k~0))\,\cont_{2 + [\,]}\\ |
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\reducesto & \reason{$\beta$-reduction}\\ |
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& 1 + \Prompt~\Continue~\cont_{2+[\,]}~(\Continue~\cont_{2 + [\,]}~0)\\ |
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\reducesto & \reason{Resume with 0}\\ |
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& 1 + \Prompt~\Continue~\cont_{2+[\,]}~(2 + 0)\\ |
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\reducesto^+ & \reason{Resume with 2}\\ |
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& 1 + \Prompt~2 + 2\\ |
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\reducesto^+ & \reason{\slab{Value} rule}\\ |
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& 1 + 4 \reducesto 5 |
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\end{derivation} |
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The continuation captured by the application of $\Control$ is |
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oblivious to the continuation $1 + [\,]$ of $\Prompt$. Since the |
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captured continuation is composable it returns to its call site. The |
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first invocation of $k$ returns the value 2, which is provided as the |
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argument to the second invocation of $k$, resulting in the value |
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$4$. The prompt gets eliminated after its computation constituent has |
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been fully reduced. Technically, the prompt is eliminated by applying |
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the continuation of $\Prompt$ with the value $4$. |
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Let us consider a slight variation of the previous example. |
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\begin{derivation} |
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& 1 + \Prompt~2 + \Control\,(\lambda k.\Continue~k~0) + \Control\,(\lambda k'. 0)\\ |
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\reducesto^+& \reason{Capture $\EC = 2 + [\,] + \Control\,(\lambda k'.0)$}\\ |
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& 1 + \Prompt~\Continue~\cont_{\EC}~0\\ |
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\reducesto & \reason{Resume with 0}\\ |
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& 1 + \Prompt~2 + 0 + \Control\,(\lambda k'. 0)\\ |
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\reducesto^+ & \reason{Capture $\EC' = 2 + [\,]$}\\ |
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& 1 + \Prompt~0 \\ |
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\reducesto & \reason{\slab{Value} rule}\\ |
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& 1 + 0 \reducesto 1 |
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\end{derivation} |
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The continuation captured by the first application of $\Control$ |
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contains another application of $\Control$. The application of the |
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continuation immediate reinstates the captured context filling the |
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hole left by the first instance of $\Control$ with the value $0$. The |
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second application of $\Control$ captures the remainder of the |
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computation of to $\Prompt$. However, the captured context gets |
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discarded, because the continuation $k'$ is never invoked. |
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\dhil{Multi-prompts: more liberal typing, no interference} |
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\paragraph{Cupto} |
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