The k-cube is k-representable
Combinatorics
2018-08-07 v1
Abstract
A graph is called -representable if there exists a word over the nodes of the graph, each node occurring exactly times, such that there is an edge between two nodes if and only after removing all letters distinct from , from , a word remains in which alternate. We prove that if is -representable for , then the Cartesian product of and the complete graph on nodes is -representable. As a direct consequence, the -cube is -representable for every . Our main technique consists of exploring occurrence based functions that replace every th occurrence of a symbol in a word by a string . The representing word we construct to achieve our main theorem is purely composed from concatenation and occurrence based functions.
Cite
@article{arxiv.1808.01800,
title = {The k-cube is k-representable},
author = {Bas Broere and Hans Zantema},
journal= {arXiv preprint arXiv:1808.01800},
year = {2018}
}
Comments
8 pages, 1 figure