De Bruijn Covering Codes for Rooted Hypergraphs
Abstract
What is the length of the shortest sequence of reals so that the set of consecutive -words in form a covering code for permutations on of radius ? (The distance between two -words is the number of transpositions needed to have the same order type.) The above problem can be viewed as a special case of finding a De Bruijn covering code for a rooted hypergraph. Each edge of a rooted hypergraph contains a special vertex, called the {\it root} of the edge, and each vertex is the root of a unique edge, called its {\it ball}. A De Bruijn covering code is a subset of the roots such that every vertex is in some edge containing a chosen root. Under some mild conditions, we obtain an upper bound for the shortest length of a De Bruijn covering code of a rooted hypergraph, a bound which is within a factor of of the lower bound.
Cite
@article{arxiv.math/0505528,
title = {De Bruijn Covering Codes for Rooted Hypergraphs},
author = {Joshua N. Cooper and Fan Chung},
journal= {arXiv preprint arXiv:math/0505528},
year = {2007}
}
Comments
10 pages, no figures