Tree decompositions and many-sided separations
Abstract
A separation of a graph G is a partition (A1, A2, C) of V(G) such that A1 is anticomplete to A2. A classic result from Robertson and Seymour's Graph Minors Project states that there is a correspondence between tree decompositions and laminar collections of separations. A many-sided separation of a graph G is a partition (A1, …, Ak, C) of V(G) such that Ai is anticomplete to Aj for all 1 ≤ i < j ≤ k. In this note, we show a correspondence between tree decompositions with a certain parity property, called deciduous tree decompositions, and laminar collections of many-sided separations.
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