Containment Graphs, Posets, and Related Classes of Graphs

Abstract

In this paper, we introduce the notion of the containment graph of a family of sets and containment classes of graphs and posets. Let Z be a family of nonempty sets. We call a (simple, finite) graph G = (V, E) a Z-containment graph provided one can assign to each vertex vi ∈ V a set Si ∈ Z such that vi vj ∈ E if and only if Si ⊂ Sj or Sj ⊂ Si . Similarly, we call a (strict) partially ordered set P = (V, <) a Z-containment poset if to each vi ∈ V we can assign a set Si ∈ Z such that vi < vj if and only if Si ⊂ Sj. Obviously, G is the comparability graph of P. We give some basic results on containment graphs and investigate the containment graphs of iso-oriented boxes in d-space. We present a characterization of those classes of posets and graphs that have containment representations by sets of a specific type, and we extend our results to ``injective'' containment classes. After that we discuss similar characterizations for intersection, overlap, and disjointedness classes of graphs. Finally, in the last section we discuss the nonexistence of a characterization theorem for ``strong'' containment classes of graphs.