Enumerating the Classes of Local Equivalency in Graphs
摘要
There are local operators on (labeled) graphs with labels coming from a finite field. If the filed is binary, in other words, if the graph is ordinary, the operation is just the local complementation. That is, to choose a vertex and complement the subgraph induced by its neighbors. But, in the general case, there are two different types of operators. The first type is the following. Let be a vertex of the graph and , the finite field of elements. The operator is to obtain a graph with labels . For the second type of operators, let and the resulted graph is a graph with labels and , for unequal to . The local complementation operator (binary case) has appeared in combinatorial theory, and its properties have studied in the literature. Recently, a profound relation between local operators on graphs and quantum stabilizer codes has been found, and it has become a natural question to recognize equivalency classes under these operators. In the present article, we show that the number of graphs locally equivalent to a given graph is at most , and consequently, the number of classes of local equivalency is .
引用
@article{arxiv.math/0702267,
title = {Enumerating the Classes of Local Equivalency in Graphs},
author = {Mohsen Bahramgiri and Salman Beigi},
journal= {arXiv preprint arXiv:math/0702267},
year = {2007}
}
备注
22 pages, no figure, more clear presentation and minor errors fixed