Affiliation:
1. Discrete Mathematics Group (DIMAG) Institute for Basic Science (IBS) Daejeon South Korea
2. Department of Mathematical Sciences KAIST Daejeon South Korea
3. Extremal Combinatorics and Probability Group (ECOPRO) Institute for Basic Science (IBS) Daejeon South Korea
4. Department of Mathematics Yonsei University Seoul South Korea
Abstract
AbstractGiven graphs over a common vertex set of size , what is the maximum value of having no “colorful” copy of , that is, a copy of containing at most one edge from each ? Keevash, Saks, Sudakov, and Verstraëte denoted this number as and completely determined for large . In fact, they showed that, depending on the value of , one of the two natural constructions is always the extremal construction. Moreover, they conjectured that the same holds for every color‐critical graphs, and proved it for 3‐color‐critical graphs. They also asked to classify the graphs that have only these two extremal constructions. We prove their conjecture for 4‐color‐critical graphs and for almost all ‐color‐critical graphs when . Moreover, we show that for every non‐color‐critical non‐bipartite graphs, none of the two natural constructions is extremal for certain values of .
Funder
Institute for Basic Science
National Research Foundation of Korea
Subject
Applied Mathematics,Computer Graphics and Computer-Aided Design,General Mathematics,Software
Cited by
5 articles.
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