English

Strong Bisimulation for Control Operators

Logic in Computer Science 2020-06-30 v2 Programming Languages

Abstract

The purpose of this paper is to identify programs with control operators whose reduction semantics are in exact correspondence. This is achieved by introducing a relation \simeq, defined over a revised presentation of Parigot's λμ\lambda\mu-calculus we dub ΛM\Lambda M. Our result builds on two fundamental ingredients: (1) factorization of λμ\lambda\mu-reduction into multiplicative and exponential steps by means of explicit term operators of ΛM\Lambda M, and (2) translation of ΛM\Lambda M-terms into Laurent's polarized proof-nets (PPN) such that cut-elimination in PPN simulates our calculus. Our proposed relation \simeq is shown to characterize structural equivalence in PPN. Most notably, \simeq is shown to be a strong bisimulation with respect to reduction in ΛM\Lambda M, i.e. two \simeq-equivalent terms have the exact same reduction semantics, a result which fails for Regnier's σ\sigma-equivalence in λ\lambda-calculus as well as for Laurent's σ\sigma-equivalence in λμ\lambda\mu.

Keywords

Cite

@article{arxiv.1906.09370,
  title  = {Strong Bisimulation for Control Operators},
  author = {Eduardo Bonelli and Delia Kesner and Andrés Viso},
  journal= {arXiv preprint arXiv:1906.09370},
  year   = {2020}
}
R2 v1 2026-06-23T10:00:29.491Z