Automorphisms of the Cube nd
Abstract
Consider a hypergraph Hnd where the vertices are points of the d-dimensional combinatorial cube nd and the edges are all sets of n points such that they are in one line. We study the structure of the group of automorphisms of Hnd, i.e., permutations of points of nd preserving the edges. In this paper we provide a complete characterization. Moreover, we consider the Colored Cube Isomorphism problem of deciding whether for two colorings of the vertices of Hnd there exists an automorphism of Hnd preserving the colors. We show that this problem is GI-complete.
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