Graph containing no induced cycles with an even number of nodes
In the mathematical area of graph theory, a graph is even-hole-free if it contains no induced cycle with an even number of vertices. More precisely, the definition may allow the graph to have induced cycles of length four, or may also disallow them: the latter is referred to as even-cycle-free graphs.[1]
While even-hole-free graphs can be recognized in polynomial time, it is NP-complete to determine whether a graph contains an even hole that includes a specific vertex.[3]
It is unknown whether graph coloring and the maximum independent set problem can be solved in polynomial time on even-hole-free graphs, or whether they are NP-complete.
However the maximum clique can be found in even-hole-free graphs in polynomial time.[4]
Chang, Hsien-Chih; Lu, Hsueh-I (January 2012), "A Faster Algorithm to Recognize Even-Hole-Free Graphs", Proceedings of the Twenty-Third Annual ACM-SIAM Symposium on Discrete Algorithms, pp. 1286–1297, arXiv:1311.0358, doi:10.1137/1.9781611973099.101, ISBN978-1-61197-210-8