On the number of edges in a graph with no (k+1)-connected subgraphs
Abstract
Mader proved that for k≥ 2 and n≥ 2k, every n-vertex graph with no (k+1)-connected subgraphs has at most (1+12)k(n-k) edges. He also conjectured that for n large with respect to k, every such graph has at most 32(k - 13)(n-k) edges. Yuster improved Mader's upper bound to 193120k(n-k) for n≥9k4. In this note, we make the next step towards Mader's Conjecture: we improve Yuster's bound to 1912k(n-k) for n≥5k2.
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