Treewidth of grid subsets
Abstract
Let Qn be the graph of n times n times n cube with all non-decreasing diagonals (including the facial ones) in its constituent unit cubes. Suppose that a subset S of V(Qn) separates the left side of the cube from the right side. We show that S induces a subgraph of tree-width at least n/sqrt18-1. We use a generalization of this claim to prove that the vertex set of Qn cannot be partitioned to two parts, each of them inducing a subgraph of bounded tree-width.
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