On Cyclic Kautz Digraphs
Abstract
A prominent problem in Graph Theory is to find extremal graphs or digraphs with restrictions in their diameter, degree and number of vertices. Here we obtain a new family of digraphs with minimal diameter, that is, given the number of vertices and out-degree there is no other digraph with a smaller diameter. This new family is called modified cyclic digraphs and it is derived from the Kautz digraphs . %It is not common to find non-regular digraphs with minimal diameter given their number of vertices and out-degree. It is well-known that the Kautz digraphs have the smallest diameter among all digraphs with their number of vertices and degree. We define the cyclic Kautz digraphs , whose vertices are labeled by all possible sequences of length , such that each character is chosen from an alphabet containing distinct symbols, where the consecutive characters in the sequence are different (as in Kautz digraphs), and now also requiring that . The cyclic Kautz digraphs have arcs between vertices and , with and . Unlike in Kautz digraphs , any label of a vertex of can be cyclically shifted to form again a label of a vertex of . We give the main parameters of : number of vertices, number of arcs, and diameter. Moreover, we construct the modified cyclic Kautz digraphs to obtain the same diameter as in the Kautz digraphs, and we show that are -out-regular. Finally, we compute the number of vertices of the iterated line digraphs of .
Keywords
Cite
@article{arxiv.1512.05917,
title = {On Cyclic Kautz Digraphs},
author = {Katerina Böhmová and Cristina Dalfó and Clemens Huemer},
journal= {arXiv preprint arXiv:1512.05917},
year = {2015}
}
Comments
20 pages