2-polarity and algorithmic aspects of polarity variants on cograph superclasses

Abstract

A graph G is said to be an (s, k)-polar graph if its vertex set admits a partition (A, B) such that A and B induce, respectively, a complete s-partite graph and the disjoint union of at most k complete graphs. Polar graphs and monopolar graphs are defined as (∞, ∞)- and (1, ∞)-polar graphs, respectively, and unipolar graphs are those graphs with a polar partition (A, B) such that A is a clique. The problems of deciding whether an arbitrary graph is a polar graph or a monopolar graph are known to be NP-complete. In contrast, deciding whether a graph is a unipolar graph can be done in polynomial time. In this work we prove that the three previous problems can be solved in linear time on the classes of P4-sparse and P4-extendible graphs, generalizing analogous results previously known for cographs. Additionally, we provide finite forbidden subgraph characterizations for (2,2)-polar graphs on P4-sparse and P4-extendible graphs, also generalizing analogous results recently obtained for the class of cographs.