English

Total Matching and Subdeterminants

Combinatorics 2024-01-01 v1 Discrete Mathematics Data Structures and Algorithms Optimization and Control

Abstract

In the total matching problem, one is given a graph GG with weights on the vertices and edges. The goal is to find a maximum weight set of vertices and edges that is the non-incident union of a stable set and a matching. We consider the natural formulation of the problem as an integer program (IP), with variables corresponding to vertices and edges. Let M=M(G)M = M(G) denote the constraint matrix of this IP. We define Δ(G)\Delta(G) as the maximum absolute value of the determinant of a square submatrix of MM. We show that the total matching problem can be solved in strongly polynomial time provided Δ(G)Δ\Delta(G) \leq \Delta for some constant ΔZ1\Delta \in \mathbb{Z}_{\ge 1}. We also show that the problem of computing Δ(G)\Delta(G) admits an FPT algorithm. We also establish further results on Δ(G)\Delta(G) when GG is a forest.

Keywords

Cite

@article{arxiv.2312.17630,
  title  = {Total Matching and Subdeterminants},
  author = {Luca Ferrarini and Samuel Fiorini and Stefan Kober and Yelena Yuditsky},
  journal= {arXiv preprint arXiv:2312.17630},
  year   = {2024}
}
R2 v1 2026-06-28T14:04:37.090Z