Graph Parameters, Universal Obstructions, and WQO

Abstract

We establish a parametric framework for obtaining obstruction characterizations of graph parameters with respect to a quasi-ordering ≤slant on graphs. At the center of this framework lies the concept of a ≤slant-parametric graph: a non ≤slant-decreasing sequence G = Gt t ∈ N of graphs indexed by non-negative integers. Parametric graphs allow us to define combinatorial objects that capture the approximate behaviour of graph parameters. A finite set G of ≤slant-parametric graphs is a ≤slant-universal obstruction for a parameter p if there exists a function f N N such that, for every k ∈ N and every graph G, 1) if p(G) ≤ k, then for every G ∈ G, Gf(k) ≤slant G, and 2) if for every G ∈ G, Gk ≤slant G, then p(G) ≤ f(k). To solidify our point of view, we identify sufficient order-theoretic conditions that guarantee the existence of universal obstructions and in this case we examine algorithmic implications on the existence of fixed-parameter tractable algorithms. Our parametric framework has further implications related to finite obstruction characterizations of properties of graph classes. A ≤slant-class property is defined as any set of ≤slant-closed graph classes that is closed under set inclusion. By combining our parametric framework with established results from order theory, we derive a precise order-theoretic characterization that ensures ≤slant-class properties can be described in terms of the exclusion of a finite set of ≤slant-parametric graphs.