Predicative Ordinal Recursion on the Constructive Veblen Hierarchy
Abstract
Inspired by Leivant's work on absolute predicativism, Bellantoni and Cook in 1992 introduced a structurally restricted form of recursion called predicative recursion. Using this recursion scheme on the inductive structures of natural numbers and binary strings, they provide a structural and machine-independent characterization of the classes of linear-space and polynomial-time computable functions, respectively. This recursion scheme can be applied to any well-founded or inductive structure, and its underlying principle, predicativization, extends naturally to other computational frameworks, such as higher-order functionals and nested recursion. In this paper, we initiate a systematic project to gauge the computational power of predicative recursion on arbitrary well-founded structures. As a natural measuring stick for well-foundedness, we use constructive ordinals. More precisely, for any downset of constructive ordinals, we define a class of predicative ordinal recursive functions that are permitted to employ a suitable form of predicative recursion on the ordinals in . We focus on the case that is a downset of constructive ordinals below , where are the functions in the Veblen hierarchy with finite index. We give a complete classification of -- for those downsets that contain at least one infinite ordinal -- in terms of the Grzegorczyk hierarchy . In this way, we extend Bellantoni-Cook's characterization of (the class of linear-space computable functions) to obtain a machine-independent and structural characterization of the entire Grzegorczyk hierarchy.
Keywords
Cite
@article{arxiv.2510.18497,
title = {Predicative Ordinal Recursion on the Constructive Veblen Hierarchy},
author = {Amirhossein Akbar Tabatabai and Vitor Greati and Revantha Ramanayake},
journal= {arXiv preprint arXiv:2510.18497},
year = {2025}
}
Comments
100 pages