On graphs containing few disjoint excluded minors. Asymptotic number and structure of graphs containing few disjoint minors K4

Abstract

Let ex \, B be a minor-closed class of graphs with a set B of minimal excluded minors. We study (a) the asymptotic number of graphs without k+1 disjoint minors in B and (b) the properties of a uniformly random graph drawn from all such graphs on vertices \1,…,n\. We present new results in the case when ex \, B contains arbitrarily large fans for a general (good enough) set of forbidden minors B. A particular case where our results hold is B = \K4\. For any fixed k = 1, 2, … we derive precise asymptotic counting formulas and describe the structure of typical graphs that have at most k disjoint minors K4. For k = 0 this is the well-known class of series-parallel graphs. For k 1 we show that typical instances have an elaborate tree-like structure with 2k+1 special vertices of very high degree. The proofs combine a variety of methods, including new structural results, Robertson and Seymour's graph minor theory and analytic combinatorics.