On Satisfiability of Nominal Subtyping with Variance

Misonizhnik, Aleksandr; Mordvinov, Dmitry

doi:10.4230/LIPIcs.ECOOP.2019.7

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LIPIcs.ECOOP.2019.7.pdf

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Document Identifiers

DOI: 10.4230/LIPIcs.ECOOP.2019.7
URN: urn:nbn:de:0030-drops-107997

Author Details

Aleksandr Misonizhnik

JetBrains Research, Saint Petersburg State University, Russia

Dmitry Mordvinov

JetBrains Research, Saint Petersburg State University, Russia

Acknowledgements

We thank Sophia Drossopoulou, Dmitry Boulytchev and anonymous reviewers for their insight and comments that significantly improved the manuscript.

Cite AsGet BibTex

Aleksandr Misonizhnik and Dmitry Mordvinov. On Satisfiability of Nominal Subtyping with Variance. In 33rd European Conference on Object-Oriented Programming (ECOOP 2019). Leibniz International Proceedings in Informatics (LIPIcs), Volume 134, pp. 7:1-7:20, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2019)
https://doi.org/10.4230/LIPIcs.ECOOP.2019.7

Abstract

Nominal type systems with variance, the core of the subtyping relation in object-oriented programming languages like Java, C# and Scala, have been extensively studied by Kennedy and Pierce: they have shown the undecidability of the subtyping between ground types and proposed the decidable fragments of such type systems. However, modular verification of object-oriented code may require reasoning about the relations of open types. In this paper, we formalize and investigate the satisfiability problem for nominal subtyping with variance. We define the problem in the context of first-order logic. We show that although the non-expansive ground nominal subtyping with variance is decidable, its satisfiability problem is undecidable. Our proof uses a remarkably small fragment of the type system. In fact, we demonstrate that even for the non-expansive class tables with only nullary and unary covariant and invariant type constructors, the satisfiability of quantifier-free conjunctions of positive subtyping atoms is undecidable. We discuss this result in detail, as well as show one decidable fragment and a scheme for obtaining other decidable fragments.

Subject Classification

ACM Subject Classification

Theory of computation → Type theory
Theory of computation → Logic and verification
Software and its engineering → Object oriented languages
Software and its engineering → Automated static analysis
Software and its engineering → Polymorphism
Software and its engineering → Inheritance

Keywords

nominal type systems
structural subtyping
first-order logic
decidability
software verification

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