Automated Testing and Interactive Construction of Unavoidable Sets for Graph Classes of Small Path-width

Abstract

We present an interactive framework that, given a membership test for a graph class G and a number k, finds and tests unavoidable sets for the class of graphs in G of path-width at most k. We put special emphasis on the case that G is the class of cubic graphs and tailor the algorithm to this case. In particular, we introduce the new concept of high-degree-first path-decompositions, which yields highly efficient pruning techniques. Using this framework we determine all extremal girth values of cubic graphs of path-width k for all k ∈ \3,…, 10\. Moreover, we determine all smallest graphs which take on these extremal girth values. As a further application of our framework we characterise the extremal cubic graphs of path-width 3 and girth 4.