Graphs with Dilworth Number Two are Pairwise Compatibility Graphs

A graph G = ( V , E ) is called a pairwise compatibility graph (PCG) if there exists a tree T, a positive edge-weight function w on T, and two non-negative real numbers d m i n and d m a x , d m i n ⩽ d m a x , such that V coincides with the set of leaves of T, and there is an edge ( u , v ) ∈ E if and only if d m i n ⩽ d T , w ( u , v ) ⩽ d m a x where d T , w ( u , v ) is the sum of the weights of the edges on the unique path from u to v in T. When the constraints on the distance between the pairs of leaves concern only d m a x or only d m i n the two subclasses LPGs (Leaf Power Graphs) and mLPGs (minimum Leaf Power Graphs) are defined. known that LPG ∩ mLPG is not empty and that threshold graphs are one of the classes contained in it. It is also known that threshold graphs are all the graphs with Dilworth number one, where the Dilworth number of a graph is the size of the largest subset of its vertices in which the close neighborhood of no vertex contains the neighborhood of another. s paper we do one step ahead toward the comprehension of the structure of the set LPG ∩ mLPG , proving that graphs with Dilworth number two belong to this intersection.