Topological embeddings into random 2-complexes

Abstract

We consider 2-dimensional random simplicial complexes Y in the multi-parameter model. We establish the multi-parameter threshold for the property that every 2-dimensional simplicial complex S admits a topological embedding into Y asymptotically almost surely. Namely, if in the procedure of the multi-parameter model, each i-dimensional simplex is taken independently with probability pi=pi(n), from a set of n vertices, then the threshold is p0 p13 p22 = 1n. This threshold happens to coincide with the previously established thresholds for uniform hyperbolicity and triviality of the fundamental group. Our claim in one direction is in fact slightly stronger, namely, we show that if p0 p13 p22 is sufficiently larger than 1n then every S has a fixed subdivision S' which admits a simplicial embedding into Y asymptotically almost surely. The main geometric result we prove to this end is that given ε>0, there is a subdivision S' of S such that every subcomplex T ⊂eq S' has f0(T)f1(T)>13-ε and f0(T)f2(T)>12-ε, where fi(T) denotes the number of simplices in T of dimension i. In the other direction we show that if p0 p13 p22 is sufficiently smaller than 1n, then asymptotically almost surely, the torus does not admit a topological embedding into Y. Here we use a result of Z. Gao which bounds the number of different triangulations of a surface.