Constructive Characterization and Recognition Algorithm for Grafts with a Connected Minimum Join
Abstract
Minimum joins in a graft (G, T), also known as minimum T-joins of a graph G, are said to be connected if they determine a connected subgraph of G. Grafts with a connected minimum join have gained interest ever since Middendorf and Pfeiffer showed that they satisfy Seymour's min-max formula for joins and T-cut packings; that is, in such grafts, the size of a minimum join is equal to the size of a maximum packing of T-cuts. In this paper, we provide a constructive characterization of grafts with a connected minimum join. We also obtain a polynomial time algorithm that decides whether a given graft has a connected minimum join and, if so, outputs one. Our algorithm has two bottlenecks; one is the time required to compute a minimum join of a graft, and the other is the time required to solve the single-source all-sink shortest path problem in a graph with conservative 1-valued edge weights. Thus, our algorithm runs in O(n(m + n n) ) time. In the nondense case, it improves upon the time bound for this problem due to Sebo and Tannier that was introduced as an application of their results on metrics on graphs.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.