English

Taming Modal Impredicativity: Superlazy Reduction

Logic in Computer Science 2008-10-17 v2

Abstract

Pure, or type-free, Linear Logic proof nets are Turing complete once cut-elimination is considered as computation. We introduce modal impredicativity as a new form of impredicativity causing the complexity of cut-elimination to be problematic from a complexity point of view. Modal impredicativity occurs when, during reduction, the conclusion of a residual of a box b interacts with a node that belongs to the proof net inside another residual of b. Technically speaking, superlazy reduction is a new notion of reduction that allows to control modal impredicativity. More specifically, superlazy reduction replicates a box only when all its copies are opened. This makes the overall cost of reducing a proof net finite and predictable. Specifically, superlazy reduction applied to any pure proof nets takes primitive recursive time. Moreover, any primitive recursive function can be computed by a pure proof net via superlazy reduction.

Keywords

Cite

@article{arxiv.0810.2891,
  title  = {Taming Modal Impredicativity: Superlazy Reduction},
  author = {Ugo Dal Lago and Luca Roversi and Luca Vercelli},
  journal= {arXiv preprint arXiv:0810.2891},
  year   = {2008}
}
R2 v1 2026-06-21T11:31:25.055Z