Sparse Partitions of Graphs with Bounded Clique Number

Abstract

We prove that for each integer r≥ 2, there exists a constant Cr>0 with the following property: for any 0< ≤ 1/2 and any graph G with clique number at most r, there is a partition of V(G) into at most (1/)Cr sets S1, …, St, such that G[Si] has maximum degree at most |Si| for each 1 ≤ i ≤ t. This answers a question of Fox, Nguyen, Scott and Seymour, who proved a similar result for graphs with no induced P4.

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