Sequence Types and Infinitary Semantics

We introduce a new representation of non-idempotent intersection types, using \textbf{sequences} (families indexed with natural numbers) instead of lists or multisets. This allows scaling up \textbf{intersection type} theory to the infinitary $\lambda$-calculus. We thus characterize hereditary head...

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1. Verfasser:	Vial, Pierre
Format:	Artikel
Sprache:	eng
Schlagworte:	Computer Science - Logic in Computer Science Computer Science - Programming Languages
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Zusammenfassung:	We introduce a new representation of non-idempotent intersection types, using \textbf{sequences} (families indexed with natural numbers) instead of lists or multisets. This allows scaling up \textbf{intersection type} theory to the infinitary $\lambda$-calculus. We thus characterize hereditary head normalization, which gives a positive answer to a question known as \textbf{Klop's Problem}. On our way, we use \textbf{non-idempotent intersection} to retrieve some well-known results on infinitary terms.
DOI:	10.48550/arxiv.2102.07515