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Breaking the Cubic Barrier for All-Pairs Max-Flow: Gomory-Hu Tree in Nearly Quadratic Time

Amir Abboud, Robert Krauthgamer, Jason Li, Debmalya Panigrahi, Thatchaphol Saranurak, Ohad Trabelsi

20222022 IEEE 63rd Annual Symposium on Foundations of Computer Science (FOCS)17 citationsDOI

Abstract

In 1961, Gomory and Hu showed that the All-Pairs Max-Flow problem of computing the max-flow between all $\begin{pmatrix}n\\2\end{pmatrix}$ pairs of vertices in an undirected graph can be solved using only $n-1$ calls to any (single-pair) max-flow algorithm. Even assuming a linear-time max-flow algorithm, this yields a running time of $O(mn)$, which is $O(n^{3})$ when $m=\Theta(n^{2})$. While subsequent work has improved this bound for various special graph classes, no subcubic-time algorithm has been obtained in the last 60 years for general graphs. We break this longstanding barrier by giving an $\tilde{O}(n^{2})$-time algorithm on general, integer-weighted graphs. Combined with a popular complexity assumption, we establish a counter-intuitive separation: all-pairs max-flows are strictly easier to compute than all-pairs shortest-paths.Our algorithm produces a cut-equivalent tree, known as the Gomory-Hu tree, from which the max-flow value for any pair can be retrieved in near-constant time. For unweighted graphs, we refine our techniques further to produce a Gomory-Hu tree in the time of a poly-logarithmic number of calls to any maxflow algorithm. This shows an equivalence between the all-pairs and single-pair max-flow problems, and is optimal up to polylogarithmic factors. Using the recently announced $m^{1+o(1)}$-time max-flow algorithm (Chen et al., March 2022), our Gomory-Hu tree algorithm for unweighted graphs also runs in $m^{1+o(1)}$-time.

Topics & Concepts

CombinatoricsMathematicsMaximum flow problemTime complexityUpper and lower boundsCubic graphTree (set theory)LogarithmDiscrete mathematicsGraphLine graphVoltage graphMathematical analysisComplexity and Algorithms in GraphsAdvanced Graph Theory ResearchOptimization and Search Problems
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