The Small-Is-Very-Small Principle
Abstract
The central result of this paper is the small-is-very-small principle for restricted sequential theories. The principle says roughly that whenever the given theory shows that a property has a small witness, i.e. a witness in every definable cut, then it shows that the property has a very small witness: i.e. a witness below a given standard number. We draw various consequences from the central result. For example (in rough formulations): (i) Every restricted, recursively enumerable sequential theory has a finitely axiomatized extension that is conservative w.r.t. formulas of complexity . (ii) Every sequential model has, for any , an extension that is elementary for formulas of complexity , in which the intersection of all definable cuts is the natural numbers. (iii) We have reflection for -sentences with sufficiently small witness in any consistent restricted theory . (iv) Suppose is recursively enumerable and sequential. Suppose further that every recursively enumerable and sequential that locally inteprets , globally interprets . Then, is mutually globally interpretable with a finitely axiomatized sequential theory. The paper contains some careful groundwork developing partial satisfaction predicates in sequential theories for the complexity measure depth of quantifier alternations.
Cite
@article{arxiv.1805.01178,
title = {The Small-Is-Very-Small Principle},
author = {Albert Visser},
journal= {arXiv preprint arXiv:1805.01178},
year = {2018}
}