An Improved Interpolation Theorem and Disproofs of Two Conjectures on 2-Connected Subgraphs
Abstract
We prove that any \(2\)-connected graph \(G\) on \(n\) vertices with minimum degree \(δ(G) n4+2\) contains a \(2\)-connected subgraph of order \(k\) for every integer \(k\) with \(4 k n\). This improves a previous result of Yin and Wu. In YinWu-DAM-2026, Yin and Wu proposed two conjectures. The first states that for any \(2\)-connected graph \(G\) of order \(n\) and size \(m\), there exists a \(2\)-connected subgraph of order \(k\) for each \(k ∈ \4, …, n\\) whenever \(m 12 n3/2\). The second conjecture asserts that the same conclusion holds under the alternative condition \(δ(G) n\). In this paper, we construct counterexamples that completely disprove the first conjecture. Furthermore, using the existence of \((v, k, 2)\)-Symmetric Balanced Incomplete Block designs (i.e., SBIBDs), we disprove the second conjecture for all \(n ∈ \8, 14, 22, 32, 74, 112, 158\\). Finally, we propose a conjecture of our own: for any \(2\)-connected graph \(G\) on \(n\) vertices with \(δ(G) nk\), where \(k 3\) and \(n\) is sufficiently large, \(G\) contains a \(2\)-connected subgraph of every order from \(4\) to \(n\).
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