Modeling Sharing and Recursion for Weak Reduction Strategies using Explicit Substitution
Résumé
We \emph{present} the $\lambda\sigma_w^a$-calculus, a formal synthesis of the concepts of sharing and explicit substitution for weak reduction. We show how $\lambda\sigma_w^a$ can be used as a foundation of implementations of functional programming languages by modeling the essential ingredients of such implementations, namely \emph{weak reduction strategies}, \emph{recursion}, \emph{space leaks}, \emph{recursive data structures}, and \emph{parallel evaluation}, in a uniform way. First, we give a precise account of the major reduction strategies used in functional programming and the consequences of choosing $\lambda$-graph-reduction vs. environment-based evaluation. Second, we show how to add \emph{constructors and explicit recursion} to give a precise account of recursive functions and data structures even with respect to space complexity. Third, we formalize the notion of \emph{space leaks} in $\lambda\sigma_w^a$ and use this to define a space leak free calculus; this suggests optimisations for call-by-need reduction that prevent space leaking and enables us to prove that the «trimming» performed by the STG machine does not leak space. In summary we give a formal account of several implementation techniques used by state of the art implementations of functional programming languages.
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