Proof of Thomassen's Conjecture on Highly connected subgraphs with large chromatic number
Abstract
For integers k 1 and m 2, let g(k,m) be the least integer n 1 such that every graph with chromatic number at least n contains a (k+1)-connected subgraph with chromatic number at least m. We prove that \[ g(k,m) (m+2k-2,\,3k+1) \] for all k 1 and m 2, establishing the 1983 conjecture of Thomassen that g(k,k+1) 3k+1. The key new ingredient is a Hall-feasibility argument replacing the final numerical step in the proof of Nguyen.
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