On Topological Minors in Random Simplicial Complexes

Abstract

For random graphs, the containment problem considers the probability that a binomial random graph G(n,p) contains a given graph as a substructure. When asking for the graph as a topological minor, i.e., for a copy of a subdivision of the given graph, it is well-known that the (sharp) threshold is at p=1/n. We consider a natural analogue of this question for higher-dimensional random complexes Xk(n,p), first studied by Cohen, Costa, Farber and Kappeler for k=2. Improving previous results, we show that p=(1/n) is the (coarse) threshold for containing a subdivision of any fixed complete 2-complex. For higher dimensions k>2, we get that p=O(n-1/k) is an upper bound for the threshold probability of containing a subdivision of a fixed k-dimensional complex.