A Sharp Threshold for Spanning 2-Spheres in Random 2-Complexes
Abstract
A Hamiltonian cycle in a graph is a spanning subgraph that is homeomorphic to a circle. With this in mind, it is natural to define a Hamiltonian d-sphere in a d-dimensional simplicial complex as a spanning subcomplex that is homeomorphic to a d-dimensional sphere. We consider the Linial-Meshulam model for random simplicial complexes, and prove that there is a sharp threshold at p=eγ n for the appearance of a Hamiltonian 2-sphere in a random 2-complex, where γ = 44/33.
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