Metastable convergence and logical compactness
Logic
2019-07-10 v2
Abstract
The concept of metastable convergence was identified by Tao;it allows converting theorems about convergence into stronger theorems about uniform convergence. The Uniform Metastability Principle (UMP) states that if is a theorem about convergence, then the fact that is valid implies automatically that its (stronger) uniform version is valid, provided that can be stated in certain logical frameworks. In this paper we identify precisely the logical frameworks for which UMP holds. More precisely, we prove that the UMP holds for if and only if is a compact logic. We also prove a topological version of this equivalence. We conclude by proving new characterizations of logical compactness that yield additional information about the UMP.
Keywords
Cite
@article{arxiv.1907.02398,
title = {Metastable convergence and logical compactness},
author = {Xavier Caicedo and Eduardo Duenez and Jose Iovino},
journal= {arXiv preprint arXiv:1907.02398},
year = {2019}
}