In the multiway cut problem, we are given an undirected graph with
non-negative edge weights and a collection of k terminal nodes, and the goal
is to partition the node set of the graph into k non-empty parts each
containing exactly one terminal so that the total weight of the edges crossing
the partition is minimized. The multiway cut problem for k≥3 is APX-hard.
For arbitrary k, the best-known approximation factor is 1.2965 due to
[Sharma and Vondr\'{a}k, 2014] while the best known inapproximability factor is
1.2 due to [Angelidakis, Makarychev and Manurangsi, 2017]. In this work, we
improve on the lower bound to 1.20016 by constructing an integrality gap
instance for the CKR relaxation.
A technical challenge in improving the gap has been the lack of geometric
tools to understand higher-dimensional simplices. Our instance is a non-trivial
3-dimensional instance that overcomes this technical challenge. We analyze
the gap of the instance by viewing it as a convex combination of
2-dimensional instances and a uniform 3-dimensional instance. We believe that
this technique could be exploited further to construct instances with larger
integrality gap. One of the ingredients of our proof technique is a
generalization of a result on \emph{Sperner admissible labelings} due to
[Mirzakhani and Vondr\'{a}k, 2015] that might be of independent combinatorial
interest.Comment: 28 page