Forbidden subgraphs generating a finite set of graphs with minimum degree three and large girth

Abstract

For a family H of graphs, a graph G is said to be H-free if G contains no member of H as an induced subgraph. We let G3(H) denote the family of connected H-free graphs having minimum degree at least 3. In this paper, we characterize the non-caterpillar trees T having diameter at least 7 such that G3(\C3,C4,T\) is a finite family, where Cn is a cycle of order n.

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