Sparse induced subgraphs in P_6-free graphs
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We prove that a number of computational problems that ask for the largest sparse induced subgraph satisfying some property definable in CMSO2 logic, most notably Feedback Vertex Set, are polynomial-time solvable in the class of P_6-free graphs. This generalizes the work of Grzesik, Klimošová, Pilipczuk, and Pilipczuk on the Maximum Weight Independent Set problem in P_6-free graphs [SODA 2019, TALG 2022], and of Abrishami, Chudnovsky, Pilipczuk, Rzążewski, and Seymour on problems in P_5-free graphs [SODA 2021]. The key step is a new generalization of the framework of potential maximal cliques. We show that instead of listing a large family of potential maximal cliques, it is sufficient to only list their carvers: vertex sets that contain the same vertices from the sought solution and have similar separation properties.
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