Polynomial Algorithms for Minimum Degree Partitions in Semicomplete Digraphs

Abstract

A 2-partition of a digraph is a partition of its vertex set into two nonempty parts. Degree-constrained 2-partition problems are generally computationally difficult, even when the prescribed properties are expressed only in terms of minimum indegree, minimum outdegree, or minimum semidegree. Bang-Jensen and Christiansen~B-C conjectured that the minimum-degree partition problems would be polynomial-time solvable on semicomplete digraphs when the degree thresholds are fixed, and Bang-Jensen and Gutin~B-G-Classes posed the related Problems~2.8.15 and~2.8.16. We resolve this conjecture. More precisely, for every fixed pair of integers k1,k2 2, we give deterministic polynomial-time algorithms that decide whether a given semicomplete digraph admits a (δ+≥ k1,δ-≥ k2)-partition, a (δ+≥ k1,δ0≥ k2)-partition, or a (δ0≥ k1,δ0≥ k2)-partition, and construct such a partition whenever one exists. Here, δ+,δ-,δ0 represent the minimum out-, in-, semi-degree, respectively. The algorithms use small degree certificates, minimal cores, closure and protective-set arguments, and deterministic universal colorings with monotone recoloring, which develop a new method in partition algorithm construction.

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