A logarithmic approximation of linearly ordered colourings

Abstract

A linearly ordered (LO) k-colouring of a hypergraph assigns to each vertex a colour from the set \0,1,…,k-1\ in such a way that each hyperedge has a unique maximum element. Barto, Batistelli, and Berg conjectured that it is NP-hard to find an LO k-colouring of an LO 2-colourable 3-uniform hypergraph for any constant k≥ 2 [STACS'21] but even the case k=3 is still open. Nakajima and Zivn\'y gave polynomial-time algorithms for finding, given an LO 2-colourable 3-uniform hypergraph, an LO colouring with O*(n) colours [ICALP'22] and an LO colouring with O*([3]n) colours [ACM ToCT'23]. Very recently, Louis, Newman, and Ray gave an SDP-based algorithm with O*([5]n) colours [FSTTCS'24]. We present two simple polynomial-time algorithms that find an LO colouring with O(2(n)) colours, which is an exponential improvement.

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