Restriction on minimum degree in the contractible sets problem

Abstract

Let G be a 3-connected graph. A set W ⊂ V(G) is called contractible if G(W) is a connected graph and G - W is a 2-connected graph. In 1994, McCuaig and Ota conjectured that for any k ∈ N there exists n ∈ N such that any 3-connected graph G with v(G) ≥slant n has a k-vertex contractible set. It is proved that this holds if k ≥slant 5 and δ(G) ≥slant [ 2k + 13 ] + 2.

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