Efficient Constructions for the Gyori-Lov\'asz Theorem on Almost Chordal Graphs

Abstract

In the 1970s, Gyori and Lov\'asz showed that for a k-connected n-vertex graph, a given set of terminal vertices t1, …, tk and natural numbers n1, …, nk satisfying Σi=1k ni = n, a connected vertex partition S1, …, Sk satisfying ti ∈ Si and |Si| = ni exists. However, polynomial algorithms to actually compute such partitions are known so far only for k ≤ 4. This motivates us to take a new approach and constrain this problem to particular graph classes instead of restricting the values of k. More precisely, we consider k-connected chordal graphs and a broader class of graphs related to them. For the first, we give an algorithm with O(n2) running time that solves the problem exactly, and for the second, an algorithm with O(n4) running time that deviates on at most one vertex from the given required vertex partition sizes.

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