English

Polymorphic Reachability Types: Tracking Freshness, Aliasing, and Separation in Higher-Order Generic Programs

Programming Languages 2023-07-27 v1

Abstract

Reachability types are a recent proposal that has shown promise in scaling to higher-order but monomorphic settings, tracking aliasing and separation on top of a substrate inspired by separation logic. The prior λ\lambda^* reachability type system qualifies types with sets of reachable variables and guarantees separation if two terms have disjoint qualifiers. However, naive extensions with type polymorphism and/or precise reachability polymorphism are unsound, making λ\lambda^* unsuitable for adoption in real languages. Combining reachability and type polymorphism that is precise, sound, and parametric remains an open challenge. This paper presents a rethinking of the design of reachability tracking and proposes a solution to the key challenge of reachability polymorphism. Instead of always tracking the transitive closure of reachable variables as in the original design, we only track variables reachable in a single step and compute transitive closures only when necessary, thus preserving chains of reachability over known variables that can be refined using substitution. To enable this property, we introduce a new freshness qualifier, which indicates variables whose reachability sets may grow during evaluation steps. These ideas yield the simply-typed λ\lambda^\diamond-calculus with precise lightweight, i.e., quantifier-free, reachability polymorphism, and the F<:\mathsf{F}_{<:}^\diamond-calculus with bounded parametric polymorphism over types and reachability qualifiers. We prove type soundness and a preservation of separation property in Coq.

Keywords

Cite

@article{arxiv.2307.13844,
  title  = {Polymorphic Reachability Types: Tracking Freshness, Aliasing, and Separation in Higher-Order Generic Programs},
  author = {Guannan Wei and Oliver Bračevac and Songlin Jia and Yuyan Bao and Tiark Rompf},
  journal= {arXiv preprint arXiv:2307.13844},
  year   = {2023}
}
R2 v1 2026-06-28T11:40:09.506Z