The Limit of Recursion in State-based Systems
Abstract
We prove that omega^2 strictly bounds the iterations required for modal definable functions to reach a fixed point across all countable structures. The result corrects and extends the previously claimed result by the first and third authors on closure ordinals of the alternation-free mu-calculus in [3]. The new approach sees a reincarnation of Kozen's well-annotations, devised for showing the finite model property for the modal mu-calculus. We develop a theory of 'conservative' well-annotations where minimality of annotations is guaranteed, and isolate parts of the structure that locally determine the closure ordinal of relevant formulas. This adoption of well-annotations enables a direct and clear pumping process that rules out closure ordinals between omega^2 and the limit of countability.
Keywords
Cite
@article{arxiv.2511.02594,
title = {The Limit of Recursion in State-based Systems},
author = {Bahareh Afshari and Giacomo Barlucchi and Graham E. Leigh},
journal= {arXiv preprint arXiv:2511.02594},
year = {2025}
}
Comments
In Proceedings FICS 2024, arXiv:2511.00626