On reduction and normalization in the computational core

Faggian, Claudia; Guerrieri, Giulio; de’Liguoro, Ugo; Treglia, Riccardo

doi:10.1017/s0960129522000433

Math. Struct. Comp. Sci.

2022

DOI: 10.1017/s0960129522000433

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On reduction and normalization in the computational core

Claudia Faggian¹,

Giulio Guerrieri²,

Ugo de’Liguoro

et al.

Abstract: We study the reduction in a $\lambda$ -calculus derived from Moggi’s computational one, which we call the computational core. The reduction relation consists of rules obtained by orienting three monadic laws. Such laws, in particular associativity and identity, introduce intricacies in the operational analysis. We investigate the central notions of returning a value versus having a normal form and address the question of normalizing strategies. Our analysis relies on factorization … Show more

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Cited by 4 publications

References 38 publications

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We extend intersection types to a computational $$\lambda $$ λ -calculus with algebraic operations à la Plotkin and Power. We achieve this by considering monadic intersections—whereby computational effects appear not only in the operational semantics, but also in the type system. Since in the effectful setting termination is not anymore the only property of interest, we want to analyze the interactive behavior of typed programs with the environment. Indeed, our type system is able to characterize the natural notion of observation, both in the finite and in the infinitary setting, and for a wide class of effects, such as output, cost, pure and probabilistic nondeterminism, and combinations thereof. The main technical tool is a novel combination of syntactic techniques with abstract relational reasoning, which allows us to lift all the required notions, e.g. of typability and logical relation, to the monadic setting.

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This paper studies the strength of embedding Call-by-Name () and Call-by-Value () into a unifying framework called the Bang Calculus (). These embeddings enable establishing (static and dynamic) properties of and through their respective counterparts in $$\texttt {dBANG} $$ dBANG . While some specific static properties have been already successfully studied in the literature, the dynamic ones are more challenging and have been left unexplored. We accomplish that by using a standard embedding for the (easy) case, while a novel one must be introduced for the (difficult) case. Moreover, a key point of our approach is the identification of diligent reduction sequences, which eases the preservation of dynamic properties from $$\texttt {dBANG} $$ dBANG to $$\texttt {dCBN}/\texttt {dCBV} $$ dCBN / dCBV . We illustrate our methodology through two concrete applications: confluence/factorization for both and are respectively derived from confluence/factorization for .

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On reduction and normalization in the computational core

Cited by 4 publications

References 38 publications

Quantitative Global Memory

Quantitative Global Memory

Monadic Intersection Types, Relationally

The Benefits of Diligence

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