Vertex Partitions of Chordal Graphs
Abstract
A k-tree is a chordal graph with no (k+2)-clique. An -tree-partition of a graph G is a vertex partition of G into `bags', such that contracting each bag to a single vertex gives an -tree (after deleting loops and replacing parallel edges by a single edge). We prove that for all k≥≥0, every k-tree has an -tree-partition in which every bag induces a connected k/(+1)-tree. An analogous result is proved for oriented k-trees.
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