English

Almost Series-Parallel graphs: structure and colorability

Combinatorics 2010-12-30 v1

Abstract

The series-parallel (SP) graphs are those containing no topological K4K_{_4} and are considered trivial. We relax the prohibition distinguishing the SP graphs by forbidding only embeddings of K4K_{_4} whose edges with both ends 3-valent (skeleton hereafter) induce a graph isomorphic to certain prescribed subgraphs of K4K_{_4}. In particular, we describe the structure of the graphs containing no embedding of K4K_{_4} whose skeleton is isomorphic to P3P_{_3} or P4P_{_4}. Such "almost series-parallel graphs" (ASP) still admit a concise description. Amongst other things, their description reveals that: 1. Essentially, the 3-connected ASP graphs are those obtained from the 3-connected cubic graphs by replacing each vertex with a triangle (e.g., the 3-connected claw-free graphs). 2. Except for K6K_{_6}, the ASP graphs are 5-colorable in polynomial time. Distinguishing between the 5-chromatic and the 4-colorable ASP graphs is NPNP-hard. 3. The ASP class is significantly richer than the SP class: 4-vertex-colorability, 3-edge-colorability, and Hamiltonicity are NPNP-hard for ASP graphs. Our interest in such ASP graphs arises from a previous paper of ours: "{\sl On the colorability of graphs with forbidden minors along paths and circuits}, Discrete Math. (to appear)".

Keywords

Cite

@article{arxiv.1012.5799,
  title  = {Almost Series-Parallel graphs: structure and colorability},
  author = {Elad Aigner-Horev},
  journal= {arXiv preprint arXiv:1012.5799},
  year   = {2010}
}

Comments

17 pages, submitted on Nov. 10 2010

R2 v1 2026-06-21T17:04:54.479Z