Extensional and Non-extensional Functions as Processes

Following Milner's seminal paper, the representation of functions as processes has received considerable attention. For pure $λ$-calculus, the process representations yield (at best) non-extensional $λ$-theories (i.e., $β$ rule holds, whereas $η$ does not). In the paper, we study how to obtain...

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Vydané v:Logical methods in computer science Ročník 21, Issue 3
Hlavní autori: Sakayori, Ken, Sangiorgi, Davide
Médium: Journal Article
Jazyk:English
Vydavateľské údaje: Logical Methods in Computer Science Association 05.09.2025
Predmet:
Computer Science
Logic in Computer Science
Programming Languages
lambda calculus
behavioural equivalence
encoding
pi-calculus
trees
ISSN:1860-5974, 1860-5974
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Shrnutí:Following Milner's seminal paper, the representation of functions as processes has received considerable attention. For pure $λ$-calculus, the process representations yield (at best) non-extensional $λ$-theories (i.e., $β$ rule holds, whereas $η$ does not). In the paper, we study how to obtain extensional representations, and how to move between extensional and non-extensional representations. Using Internal $π$, $\mathrm{I}π$ (a subset of the $π$-calculus in which all outputs are bound), we develop a refinement of Milner's original encoding of functions as processes that is parametric on certain abstract components called wires. These are, intuitively, processes whose task is to connect two end-point channels. We show that when a few algebraic properties of wires hold, the encoding yields a $λ$-theory. Exploiting the symmetries and dualities of $\mathrm{I}π$, we isolate three main classes of wires. The first two have a sequential behaviour and are dual of each other; the third has a parallel behaviour and is the dual of itself. We show the adoption of the parallel wires yields an extensional $λ$-theory; in fact, it yields an equality that coincides with that of Böhm trees with infinite $η$. In contrast, the other two classes of wires yield non-extensional $λ$-theories whose equalities are those of the Lévy-Longo and Böhm trees.
ISSN:1860-5974
1860-5974
DOI:10.46298/lmcs-21(3:25)2025