English

Counting and enumerating optimum cut sets for hypergraph $k$-partitioning problems for fixed $k$

Data Structures and Algorithms 2023-03-09 v2 Discrete Mathematics

Abstract

We consider the problem of enumerating optimal solutions for two hypergraph kk-partitioning problems -- namely, Hypergraph-kk-Cut and Minmax-Hypergraph-kk-Partition. The input in hypergraph kk-partitioning problems is a hypergraph G=(V,E)G=(V, E) with positive hyperedge costs along with a fixed positive integer kk. The goal is to find a partition of VV into kk non-empty parts (V1,V2,,Vk)(V_1, V_2, \ldots, V_k) -- known as a kk-partition -- so as to minimize an objective of interest. 1. If the objective of interest is the maximum cut value of the parts, then the problem is known as Minmax-Hypergraph-kk-Partition. A subset of hyperedges is a minmax-kk-cut-set if it is the subset of hyperedges crossing an optimum kk-partition for Minmax-Hypergraph-kk-Partition. 2. If the objective of interest is the total cost of hyperedges crossing the kk-partition, then the problem is known as Hypergraph-kk-Cut. A subset of hyperedges is a min-kk-cut-set if it is the subset of hyperedges crossing an optimum kk-partition for Hypergraph-kk-Cut. We give the first polynomial bound on the number of minmax-kk-cut-sets and a polynomial-time algorithm to enumerate all of them in hypergraphs for every fixed kk. Our technique is strong enough to also enable an nO(k)pn^{O(k)}p-time deterministic algorithm to enumerate all min-kk-cut-sets in hypergraphs, thus improving on the previously known nO(k2)pn^{O(k^2)}p-time deterministic algorithm, where nn is the number of vertices and pp is the size of the hypergraph. The correctness analysis of our enumeration approach relies on a structural result that is a strong and unifying generalization of known structural results for Hypergraph-kk-Cut and Minmax-Hypergraph-kk-Partition. We believe that our structural result is likely to be of independent interest in the theory of hypergraphs (and graphs).

Keywords

Cite

@article{arxiv.2204.09178,
  title  = {Counting and enumerating optimum cut sets for hypergraph $k$-partitioning problems for fixed $k$},
  author = {Calvin Beideman and Karthekeyan Chandrasekaran and Weihang Wang},
  journal= {arXiv preprint arXiv:2204.09178},
  year   = {2023}
}

Comments

Accepted to ICALP'22. Claims 2.2, 2.3, 2.4, and 2.5 in this work are similar to the claims in the proof of a structural theorem in arXiv: 2110.14815. Since the hypothesis of the theorem in this work is different from that of the theorem in arXiv: 2110.14815, complete proofs of these claims are presented. The usage of these claims in this work is also different from the usage in arXiv: 2110.14815. arXiv admin note: text overlap with arXiv:2110.14815

R2 v1 2026-06-24T10:52:42.167Z