A tamed family of triangle-free graphs with unbounded chromatic number
Abstract
We construct a hereditary class of triangle-free graphs with unbounded chromatic number, in which every non-trivial graph either contains a pair of non-adjacent twins or has an edgeless vertex cutset of size at most two. This answers in the negative a question of Chudnovsky, Penev, Scott, and Trotignon. The class is the hereditary closure of a family of (triangle-free) twincut graphs G1, G2, … such that Gk has chromatic number k. We also show that every twincut graph is edge-critical.
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