Sufficient average degree conditions for the existence of large highly connected subgraphs
Abstract
Mader proved that every sufficiently large graph with average degree at least (2+2)k has a (k+1)-connected subgraph. He also conjectured that an average degree of at least 3k is sufficient. The best known sufficient factor was improved by multiple authors but never reached 3. In the present paper, it is further improved to 3.109. In addition, the obtained (k+1)-connected subgraph is constrained to have more than 1.2k vertices. Moreover, similar conditions on the average degree are proven to be sufficient for the existence of even greater (k+1)-connected subgraphs.
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