Combinatorics of $\lambda$-terms: a natural approach

Bendkowski, Maciej; Grygiel, Katarzyna; Lescanne, Pierre; Zaionc, Marek

doi:10.1093/logcom/exx018

Cited by 13 publications

(21 citation statements)

References 15 publications

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“…Should there be fewer abstractions than n + 1, then n represents a free variable occurrence. And so, in the De Bruijn notation both λxyz.xz(yz) and λabc.ac(bc) admit the same representation λλλ.20 (10), see Figure 1.…”

Section: 2mentioning

confidence: 97%

How to generate random lambda terms?

Bendkowski

2020

Preprint

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Section: 2mentioning

confidence: 97%

How to generate random lambda terms?

Bendkowski

2020

Preprint

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“…The following results exhibit the closed-form of generating functions corresponding to pure terms as well as the general class of λυ-terms and explicit substitutions. Proposition 6.2 (see [5]). Let L ∞ (z) denote the generating function corresponding to the set of λ-terms in υ-normal form (i.e.…”

Section: (K)mentioning

confidence: 99%

Towards the average-case analysis of substitution resolution in $λ$-calculus

Bendkowski¹

2018

Preprint

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Substitution resolution supports the computational character of β-reduction, complementing its execution with a capture-avoiding exchange of terms for bound variables. Alas, the meta-level definition of substitution, masking a non-trivial computation, turns β-reduction into an atomic rewriting rule, despite its varying operational complexity.In the current paper we propose a somewhat indirect average-case analysis of substitution resolution in the classic λ-calculus, based on the quantitative analysis of substitution in λυ, an extension of λ-calculus internalising the υ-calculus of explicit substitutions. Within this framework, we show that for any fixed n ≥ 0, the probability that a uniformly random, conditioned on size, λυ-term υ-normalises in n normal-order (i.e. leftmost-outermost) reduction steps tends to a computable limit as the term size tends to infinity.For that purpose, we establish an effective hierarchy (Gn) n of regular tree grammars partitioning υ-normalisable terms into classes of terms normalising in n normal-order rewriting steps. The main technical ingredient in our construction is an inductive approach to the construction of Gn+1 out of Gn based, in turn, on the algorithmic construction of finite intersection partitions, inspired by Robinson's unification algorithm.Finally, we briefly discuss applications of our approach to other term rewriting systems, focusing on two closely related formalisms, i.e. the full λυ-calculus and combinatory logic.

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“…Enumeration. In the current paper we follow [7,8,27,15] and investigate the statistical properties of random λ-terms in the de Bruijn representation. We assume a unary base encoding of indices, i.e.…”

Section: 11mentioning

confidence: 99%

“…Investigations into quantitative properties of λ-terms in the de Bruijn notation were continued by Bendkowski et al [7,8] who showed that, in contrast to the canonical representation of David et al, asymptotically almost all λ-terms are not strongly normalising. In other words, the proportion of terms for which all evaluation strategies terminate approaches zero as the term size tends to infinity.…”

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Statistical Properties of Lambda Terms

Bendkowski

Bodini²,

Dovgal³

2019

Electron. J. Combin.

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We present a quantitative, statistical analysis of random lambda terms in the de Bruijn notation. Following an analytic approach using multivariate generating functions, we investigate the distribution of various combinatorial parameters of random open and closed lambda terms, including the number of redexes, head abstractions, free variables or the de Bruijn index value profile. Moreover, we conduct an average-case complexity analysis of finding the leftmost-outermost redex in random lambda terms showing that it is on average constant. The main technical ingredient of our analysis is a novel method of dealing with combinatorial parameters inside certain infinite, algebraic systems of multivariate generating functions. Finally, we briefly discuss the random generation of lambda terms following a given skewed parameter distribution and provide empirical results regarding a series of more involved combinatorial parameters such as the number of open subterms and binding abstractions in closed lambda terms.

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Combinatorics of $\lambda$-terms: a natural approach

Cited by 13 publications

References 15 publications

How to generate random lambda terms?

How to generate random lambda terms?

Towards the average-case analysis of substitution resolution in $λ$-calculus

Statistical Properties of Lambda Terms

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