Deterministic Vertex Connectivity via Common-Neighborhood Clustering and Pseudorandomness

Abstract

We give a deterministic algorithm for computing a global minimum vertex cut in a vertex-weighted graph n vertices and m edges in O(mn) time. This breaks the long-standing (n4)-time barrier in dense graphs, achievable by trivially computing all-pairs maximum flows. Up to subpolynomial factors, we match the fastest randomized O(mn)-time algorithm by [Henzinger, Rao, and Gabow'00], and affirmatively answer the question by [Gabow'06] whether deterministic O(mn)-time algorithms exist even for unweighted graphs. Our algorithm works in directed graphs, too. In unweighted undirected graphs, we present a faster deterministic O(m)-time algorithm where n is the size of the global minimum vertex cut. For a moderate value of , this strictly improves upon all previous deterministic algorithms in unweighted graphs with running time O(m(n+2)) [Even'75], O(m(n+n)) [Gabow'06], and O(m2O(2)) [Saranurak and Yingchareonthawornchai'22]. Recently, a linear-time algorithm has been shown by [Korhonen'24] for very small . Our approach applies the common-neighborhood clustering, recently introduced by [Blikstad, Jiang, Mukhopadhyay, Yingchareonthawornchai'25], in novel ways, e.g., on top of weighted graphs and on top of vertex-expander decomposition. We also exploit pseudorandom objects often used in computational complexity communities, including crossing families based on dispersers from [Wigderson and Zuckerman'99; TaShma, Umans and Zuckerman'01] and selectors based on linear lossless condensers [Guruswwami, Umans and Vadhan'09; Cheraghchi'11]. To our knowledge, this is the first application of selectors in graph algorithms.

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