none1noImposing linearity and ramification constraints allows to weaken higher-order (primitive) recursion in such a way that the class of representable functions equals the class of polynomial-time computable functions, as the works by Leivant, Hofmann, and others show. This article shows that fine-tuning these two constraints leads to different expressive strengths, some of them lying well beyond polynomial time. This is done by introducing a new semantics, called algebraic context semantics. The framework stems from Gonthier's original work (itself a model of Girard's geometry of interaction) and turns out to be a versatile and powerful tool for the quantitative analysis of normalization in the lambda calculus with constants and higher...
We investigate the expressive power of higher-order recursion schemes (HORS) restricted to linear ty...
AbstractIt is well-known that by a single use of higher type recursion on notation one can define pr...
This paper extends the termination proof techniques based on reduction orderings to a higher-order s...
Imposing linearity and ramification constraints allows to weaken higher-order (primitive) recursion ...
AbstractIt is shown how to restrict recursion on notation in all finite types so as to characterize ...
Higher-order recursion schemes are recursive equations defining newoperations from given ones called...
Abstract. A typed lambda calculus with recursion in all finite types is defined such that the first ...
Abstract. A typed lambda calculus with recursion in all finite types is defined such that the first ...
Higher-order abstract syntax is a central representation technique in logical frameworks which maps ...
© 2019 Elsevier B.V. Intensional computations are those that query the internal structure of their a...
It is well known that confluence and strong normalization are preserved when combining left-linear a...
© 2018 Association for Computing Machinery. Recursive programs can now be expressed as normal forms ...
This research is funded by NFS under grants CCR-0133502 and CCR-0325808. Higher-order encodings use ...
International audienceWe design an interpretation-based theory of higher-order functions that is wel...
This paper investigates analogs of the Kreisel-Lacombe-Shoenfield Theorem in the context of the type...
We investigate the expressive power of higher-order recursion schemes (HORS) restricted to linear ty...
AbstractIt is well-known that by a single use of higher type recursion on notation one can define pr...
This paper extends the termination proof techniques based on reduction orderings to a higher-order s...
Imposing linearity and ramification constraints allows to weaken higher-order (primitive) recursion ...
AbstractIt is shown how to restrict recursion on notation in all finite types so as to characterize ...
Higher-order recursion schemes are recursive equations defining newoperations from given ones called...
Abstract. A typed lambda calculus with recursion in all finite types is defined such that the first ...
Abstract. A typed lambda calculus with recursion in all finite types is defined such that the first ...
Higher-order abstract syntax is a central representation technique in logical frameworks which maps ...
© 2019 Elsevier B.V. Intensional computations are those that query the internal structure of their a...
It is well known that confluence and strong normalization are preserved when combining left-linear a...
© 2018 Association for Computing Machinery. Recursive programs can now be expressed as normal forms ...
This research is funded by NFS under grants CCR-0133502 and CCR-0325808. Higher-order encodings use ...
International audienceWe design an interpretation-based theory of higher-order functions that is wel...
This paper investigates analogs of the Kreisel-Lacombe-Shoenfield Theorem in the context of the type...
We investigate the expressive power of higher-order recursion schemes (HORS) restricted to linear ty...
AbstractIt is well-known that by a single use of higher type recursion on notation one can define pr...
This paper extends the termination proof techniques based on reduction orderings to a higher-order s...