On well-covered direct products
Abstract
A graph is well-covered if all maximal independent sets of have the same cardinality. In 1992 Topp and Volkmann investigated the structure of well-covered graphs that have nontrivial factorizations with respect to some of the standard graph products. In particular, they showed that both factors of a well-covered direct product are also well-covered and proved that the direct product of two complete graphs (respectively, two cycles) is well-covered precisely when they have the same order (respectively, both have order 3 or 4). Furthermore, they proved that the direct product of two well-covered graphs with independence number one-half their order is well-covered. We initiate a characterization of nontrivial, connected well-covered graphs and , whose independence numbers are strictly less than one-half their orders, such that their direct product is well-covered. In particular, we show that in this case both and have girth 3 and we present several infinite families of such well-covered direct products. Moreover, we show that if is a factor of any well-covered direct product, then is a complete graph unless it is possible to create an isolated vertex by removing the closed neighborhood of some independent set of vertices in .
Cite
@article{arxiv.1901.03218,
title = {On well-covered direct products},
author = {Kirsti Kuenzel and Douglas F. Rall},
journal= {arXiv preprint arXiv:1901.03218},
year = {2019}
}