Forbidden subgraphs generating a finite set

Jun Fujisawa, Michael D. Plummer, Akira Saito

研究成果: Article査読

6 被引用数 (Scopus)

抄録

For a set F of connected graphs, a graph G is said to be F -free if G does not contain any member of F as an induced subgraph. The members of F are referred to as forbidden subgraphs. When we study the relationship between forbidden subgraphs and a certain graph property, we often allow the possibility of the existence of exceptional graphs as long as their number is finite. However, in this type of research, if the set of k-connected F -free graphs itself, denoted by Gk(F ), is finite, then every graph in Gk(F ) logically satisfies all the graph properties, except for possibly a finite number of exceptions. If this occurs, F does not give any information about a particular property. We think that such sets F obscure the view in the study of forbidden subgraphs, and we want to remove them. With this motivation, we study the sets F with finite Gk(F ). We prove that if |F | ≤ 2 and Gk(F ) is finite, then either K1,2 F or F consists of a complete graph and a star. For each of the values of k, 1 ≤ k ≤ 6, we then characterize all the pairs {Kl, K1,m} such that Gk({Kl, K1,m}) is finite. We also give a complete characterization of F with |F | ≤ 3 and finite G2(F ).

本文言語English
ページ(範囲)1835-1842
ページ数8
ジャーナルDiscrete Mathematics
313
19
DOI
出版ステータスPublished - 2013

ASJC Scopus subject areas

  • 理論的コンピュータサイエンス
  • 離散数学と組合せ数学

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