Helly EPT graphs on bounded degree trees: forbidden induced subgraphs and efficient recognition

Abstract

The edge intersection graph of a family of paths in host tree is called an EPT graph. When the host tree has maximum degree h, we say that G belongs to the class [h,2,2]. If, in addition, the family of paths satisfies the Helly property, then G ∈ Helly [h,2,2]. The time complexity of the recognition of the classes [h,2,2] inside the class EPT is open for every h> 4. Golumbic et al. wonder if the only obstructions for an EPT graph belonging to [h,2,2] are the chordless cycles Cn for n> h. In the present paper, we give a negative answer to that question, we present a family of EPT graphs which are forbidden induced subgraphs for the classes [h,2,2]. Using them we obtain a total characterization by induced forbidden subgraphs of the classes Helly [h,2,2] for h≥ 4 inside the class EPT. As a byproduct, we prove that Helly EPT [h,2,2]= Helly [h,2,2]. We characterize Helly [h,2,2] graphs by their atoms in the decomposition by clique separators. We give an efficient algorithm to recognize Helly [h,2,2] graphs.