A High-Dimensional Extension of Wagner's Theorem and the Geometrization of Hypergraphs
Abstract
This paper introduces a geometric representation of hypergraphs by representing hyperedges as simplices. Building on this framework, we employ homotopy groups to analyze the topological structure of hypergraphs embedded in high-dimensional Euclidean spaces. Under the assumptions of the triangulation and that all i-th homotopy groups are trivial for i ≤ d-2, we provide a necessary and sufficient condition for a d-uniform hypergraph to be embeddable in Rd, which can be regarded as a kind of high-dimensional extension of Wagner's Theorem for planar graphs. Specifically, we establish that a triangulated d-uniform topological hypergraph embeds into Rd if and only if it contains neither Kd+3d nor K3,d+1d as a minor. Here, a triangulated d-uniform topological hypergraph constitutes a geometrized form of a d-uniform hypergraph, while Kd+3d and K3,d+1d are the high-dimensional generalizations of the complete graph K5 and the complete bipartite graph K3,3 in Rd, respectively.
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