Graph Universal Cycles of Combinatorial Objects
Abstract
A connected digraph in which the in-degree of any vertex equals its out-degree is Eulerian; this baseline result is used as the basis of existence proofs for universal cycles (also known as ucycles or generalized deBruijn cycles or U-cycles) of several combinatorial objects. The existence of ucycles is often dependent on the specific representation that we use for the combinatorial objects. For example, should we represent the subset of as "25" in a linear string? Is the representation "52" acceptable? Or it it tactically advantageous (and acceptable) to go with ? In this paper, we represent combinatorial objects as graphs, as in \cite{bks}, and exhibit the flexibility and power of this representation to produce {\it graph universal cycles}, or {\it Gucycles}, for -subsets of an -set; permutations (and classes of permutations) of , and partitions of an -set, thus revisiting the classes first studied in \cite{cdg}. Under this graphical scheme, we will represent as the subgraph of with edge set consisting of and , namely the "second" and "fifth" edges in . Permutations are represented via their permutation graphs, and set partitions through disjoint unions of complete graphs.
Keywords
Cite
@article{arxiv.1911.07905,
title = {Graph Universal Cycles of Combinatorial Objects},
author = {Amelia Cantwell and Juliann Geraci and Anant Godbole and Cristobal Padilla},
journal= {arXiv preprint arXiv:1911.07905},
year = {2019}
}
Comments
16 pages, 13 figures