@article{article_776898, title={Boolean Hypercubes, Mersenne Numbers, and the Collatz Conjecture}, journal={Journal of Mathematical Sciences and Modelling}, volume={3}, pages={120–129}, year={2020}, DOI={10.33187/jmsm.776898}, author={Carbó Dorca, Ramon}, keywords={Boolean Hypercubes, Recursive Construction of Natural Numbers, Mersenne Numbers, Mersenne Twins, Collatz Conjecture, (3x+1) Conjecture, Collatz Algorithm, Collatz Operator}, abstract={<div style="text-align:justify;"> <span style="font-size:14px;">This study is based on the trivial transcription of the vertices of a Boolean \textit{N}-Dimensional Hypercube $\textbf{H}_{N} $ into a subset $\mathbb{S}_{N}$ of the decimal natural numbers $\mathbb{N}.$ Such straightforward mathematical manipulation permits to achieve a recursive construction of the whole set $\mathbb{N}.$ In this proposed scheme, the Mersenne numbers act as upper bounds of the iterative building of $\mathbb{S}_{N}$. The paper begins with a general description of the Collatz or $\left(3x+1\right)$ algorithm presented in the $\mathbb{S}_{N} \subset \mathbb{N}$ iterative environment. Application of a defined \textit{ad hoc} Collatz operator to the Boolean Hypercube recursive partition of $\mathbb{N}$, permits to find some hints of the behavior of natural numbers under the $\left(3x+1\right)$ algorithm, and finally to provide a scheme of the Collatz conjecture partial resolution by induction. </span> </div>}, number={3}, publisher={Mahmut AKYİĞİT}