Easy and hard separation of sparse and dense odd-set constraints in matching

• Published in: Discrete optimization Vol. 54; p. 100849
• Main Authors: Hunsaker, Brady, Tovey, Craig
• Format: Journal Article
• Language: English
• Published: Elsevier B.V 01.11.2024
• Subjects: Fractional matching; Odd-set constraints; Perfect matching polytope; Separation; Sparse cuts; Fractional matching; Perfect matching polytope; Sparse cuts; Separation; Odd-set constraints
• ISSN: 1572-5286
• DOI: 10.1016/j.disopt.2024.100849

We investigate polytopes intermediate between the fractional matching and the perfect matching polytopes, by imposing a strict subset of the odd-set (blossom) constraints. For sparse constraints, we give a polynomial time separation algorithm if only constraints on all odd sets bounded by a given size (e.g. ≤9+|V|/6) are present. Our algorithm also solves the more general problem of finding a T-cut subject to upper bounds on the cardinality of its defining node set and on its cost. In contrast, regarding dense constraints, we prove that for every 0<α≤12, it is NP-complete to separate over the class of constraints on odd sets of size 2⌊(1+α|V|)/2⌋−1 or ≥α|V|.