d-representability as an embedding problem

Abstract

An abstract simplicial complex is said to be d-representable if it records the intersection pattern of a collection of convex sets in Rd. In this paper, we show that d-representability of a simplicial complex is equivalent to the existence of a map with certain properties, from a closely related simplicial complex into Rd. This equivalence suggests a framework for proving (and disproving) d-representability of simplicial complexes using topological methods such as applications of the Borsuk-Ulam theorem, which we begin to explore.

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