Construction and Set Theory
Abstract
This paper argues that mathematical objects are constructions and that constructions introduce a flexibility in the ways that mathematical objects are represented (as sets of binary sequences for example) and presented (in a particular order for example). The construction approach is then applied to searching for a mathematical object in a set, and a logarithm-time search algorithm outlined which applies to a set X of all binary sequences of length ordinal with a binary label appended to each sequence to indicate that sequence is a member of X or not. It follows that deciding membership of a set for a given binary sequence of length of binary sequence of cardinal length takes bits, which is shown to be equivalent to the Generalised Continuum Hypothesis on the assumption that information is minimised when a mathematical object is created.
Cite
@article{arxiv.1902.07373,
title = {Construction and Set Theory},
author = {Andrew Powell},
journal= {arXiv preprint arXiv:1902.07373},
year = {2020}
}
Comments
7 pages, no figures. Experimental paper; comments welcome; minor changes made to justify (++) principle