Characterizing forbidden pairs for spanning -subgraphs of 2-connected graphs

Abstract

Let F be a set of connected graphs, and let G be a graph. We say that G is F-free if it does not contain F as an induced subgraph for all F∈F, and we call F a forbidden pair if |F|=2. A -graph is the graph consisting of three internally disjoint paths with the same pair of end-vertices. If the -subgraph T contains all vertices of G, then we call T a spanning -subgraph of G. In this paper, we characterize all pairs of connected graphs R,S such that every 2-connected \R,S\-free graph has a spanning -subgraph. In order to obtain this result, we also characterize all minimal 2-connected non-cycle claw-free graphs without spanning -subgraphs.

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