Around Eggleston Theorem
Abstract
The motivation of this work are the two classical theorems on inscribing rectangles and squares into large subsets of the plane, namely Eggleston Theorem and Mycielski Theorem. Using Shoenfield Absoluteness Theorem we prove that for every Borel subset of the plane with uncountably many positive (with respect to measure or category) vertical section contains a rectangle where is perfect and is Borel and positive. We also obtained a variant of Eggleston Theorem regarding the -ideal generated by closed sets of measure zero. Furthermore we proved that every comeager (resp. conull) subset of the plane contains a rectangle , where is a Spinas tree containing a Silver tree and is comeager (resp. conull). Moreover we obtained a common generalization of Eggleston Theorem and Mycielski Theorem stating that every comeager (resp. conull) subset of the plane contains a rectangle modulo diagonal, where is a uniformly perfect tree, is comeager (resp. conull) and .
Keywords
Cite
@article{arxiv.2307.07020,
title = {Around Eggleston Theorem},
author = {Marcin Michalski and Robert Rałowski and Szymon Żeberski},
journal= {arXiv preprint arXiv:2307.07020},
year = {2024}
}