Enumeration of interval graphs and d-representable complexes
Abstract
For each fixed d 1, we obtain asymptotic estimates for the number of d-representable simplicial complexes on n vertices as a function of n. The case d=1 corresponds to counting interval graphs, and we obtain new results in this well-studied case as well. Our results imply that the d-representable complexes comprise a vanishingly small fraction of d-collapsible complexes.
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