A lower bound on the number of homotopy types of simplicial complexes on n vertices
Abstract
For n ∈ N, let h(n) denote the number of simplicial complexes on n vertices up to homotopy equivalence. Here we prove that h(n) ≥ 220.02n when n is large enough. Together with the trivial upper bound of 22n on the number of labeled simplicial complexes on n vertices this proves a conjecture of Kalai that h(n) is doubly exponential in n.
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