Modular Termination for Second-Order Computation Rules and Application to Algebraic Effect Handlers

We present a new modular proof method of termination for second-order computation, and report its implementation SOL. The proof method is useful for proving termination of higher-order foundational calculi. To establish the method, we use a variation of semantic labelling translation and Blanqui...

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Bibliographic Details
Published in:Logical methods in computer science Vol. 18, Issue 2
Main Author: Hamana, Makoto
Format: Journal Article
Language:English
Published: Logical Methods in Computer Science e.V 14.06.2022
Subjects:
computer science - logic in computer science
computer science - symbolic computation
ISSN:1860-5974, 1860-5974
Online Access:Get full text
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Summary:We present a new modular proof method of termination for second-order computation, and report its implementation SOL. The proof method is useful for proving termination of higher-order foundational calculi. To establish the method, we use a variation of semantic labelling translation and Blanqui's General Schema: a syntactic criterion of strong normalisation. As an application, we apply this method to show termination of a variant of call-by-push-value calculus with algebraic effects and effect handlers. We also show that our tool SOL is effective to solve higher-order termination problems.
ISSN:1860-5974
1860-5974
DOI:10.46298/lmcs-18(2:18)2022