The Collatz conjecture and De Bruijn graphs
Number Theory
2013-11-11 v1 Discrete Mathematics
Dynamical Systems
Abstract
We study variants of the well-known Collatz graph, by considering the action of the 3n+1 function on congruence classes. For moduli equal to powers of 2, these graphs are shown to be isomorphic to binary De Bruijn graphs. Unlike the Collatz graph, these graphs are very structured, and have several interesting properties. We then look at a natural generalization of these finite graphs to the 2-adic integers, and show that the isomorphism between these infinite graphs is exactly the conjugacy map previously studied by Bernstein and Lagarias. Finally, we show that for generalizations of the 3n+1 function, we get similar relations with 2-adic and p-adic De Bruijn graphs.
Keywords
Cite
@article{arxiv.1209.3495,
title = {The Collatz conjecture and De Bruijn graphs},
author = {Thijs Laarhoven and Benne de Weger},
journal= {arXiv preprint arXiv:1209.3495},
year = {2013}
}
Comments
9 pages, 8 figures