Introduces the first intersection type system for a lambda calculus with algebraic effects and handlers that characterizes termination via subject reduction and expansion while inducing a sound simple type system with decidable HOMC.
Local Temporal Reasoning
5 Pith papers cite this work. Polarity classification is still indexing.
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Underapproximate types with symbolic traces guide synthesis of test generators that outperform defaults in property-based testing and model checking for effectful programs.
Extends intensional type theory with large sizes and parametric quantifiers to construct inductive and coinductive types, justified by a realisability model interpreting sizes as an uncountable ordinal.
A finitary refinement type system is sound and complete for Scott-open properties in a fixpoint-like logic over spectral Scott domains.
Effect systems are formally related to abstract interpretations via embeddings of effect quantales into abstract domains and recovery of quantales as event-based interpretations.
citing papers explorer
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When Types Intersect and Effects Get Handled
Introduces the first intersection type system for a lambda calculus with algebraic effects and handlers that characterizes termination via subject reduction and expansion while inducing a sound simple type system with decidable HOMC.
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Trace-Guided Synthesis of Effectful Test Generators
Underapproximate types with symbolic traces guide synthesis of test generators that outperform defaults in property-based testing and model checking for effectful programs.
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Constructing (Co)inductive Types via Large Sizes
Extends intensional type theory with large sizes and parametric quantifiers to construct inductive and coinductive types, justified by a realisability model interpreting sizes as an uncountable ordinal.
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A Complete Finitary Refinement Type System for Scott-Open Properties
A finitary refinement type system is sound and complete for Scott-open properties in a fixpoint-like logic over spectral Scott domains.
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Effect Systems as Abstract Interpretations
Effect systems are formally related to abstract interpretations via embeddings of effect quantales into abstract domains and recovery of quantales as event-based interpretations.