$H$-product and $H$-threshold graphs
Abstract
This paper is the continuation of the research of the author and his colleagues of the {\it canonical} decomposition of graphs. The idea of the canonical decomposition is to define the binary operation on the set of graphs and to represent the graph under study as a product of prime elements with respect to this operation. We consider the graph together with the arbitrary partition of its vertex set into subsets (-partitioned graph). On the set of -partitioned graphs distinguished up to isomorphism we consider the binary algebraic operation (-product of graphs), determined by the digraph . It is proved, that every operation defines the unique factorization as a product of prime factors. We define -threshold graphs as graphs, which could be represented as the product of one-vertex factors, and the threshold-width of the graph as the minimum size of such, that is -threshold. -threshold graphs generalize the classes of threshold graphs and difference graphs and extend their properties. We show, that the threshold-width is defined for all graphs, and give the characterization of graphs with fixed threshold-width. We study in detail the graphs with threshold-widths 1 and 2.
Cite
@article{arxiv.1011.4726,
title = {$H$-product and $H$-threshold graphs},
author = {Pavel Skums},
journal= {arXiv preprint arXiv:1011.4726},
year = {2016}
}