English

A Simple Deterministic Reduction From Gomory-Hu Tree to Maxflow and Expander Decomposition

Data Structures and Algorithms 2026-04-28 v2

Abstract

Given an undirected graph G=(V,E,w)G=(V,E,w), a Gomory-Hu tree TT (Gomory and Hu, 1961) is a tree on VV that preserves all-pairs mincuts of GG exactly. We present a simple and efficient randomized reduction from Gomory-Hu trees to polylog maxflow computations. On unweighted graphs, our reduction reduces to maxflow computations on graphs of total instance size O~(m)\tilde{O}(m) and the algorithm requires only O~(m)\tilde{O}(m) additional time. Our reduction is the first that is tight up to polylog factors. The reduction also seamlessly extends to weighted graphs, however, instance sizes and runtime increase to O~(n2)\tilde{O}(n^2). Finally, we show how to extend our reduction to reduce Gomory-Hu trees for unweighted hypergraphs to maxflow in hypergraphs. Again, our reduction is the first that is tight up to polylog factors.

Keywords

Cite

@article{arxiv.2510.27330,
  title  = {A Simple Deterministic Reduction From Gomory-Hu Tree to Maxflow and Expander Decomposition},
  author = {Maximilian Probst Gutenberg and Weixuan Yuan},
  journal= {arXiv preprint arXiv:2510.27330},
  year   = {2026}
}

Comments

The paper is a follow-up work of the following paper: A Simple and Fast Reduction from Gomory-Hu Trees to Polylog Maxflows (arXiv:2509.02520) Our runtime analysis directly follows from the runtime analysis in the above-mentioned paper, which contains a gap, making the runtime analysis invalid

R2 v1 2026-07-01T07:15:23.282Z