A new k-partite graph k-clique iterator and the optimal colored Tverberg problem for ten colored points

Abstract

We provide an algorithm that verifies the optimal colored Tverberg problem for 10 points in the plane: Every 10 points in the plane in color classes of size at most 3 can be partitioned in 4 rainbow pieces such that their convex hulls intersect in a common point. This is achieved by translating the problem to k-partite graphs and using a new algorithm to verify that those graphs do not have a k-clique.

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