Hardness of almost embedding simplicial complexes in Rd

Abstract

A map f K Rd of a simplicial complex is an almost embedding if f(σ) f(τ)= whenever σ,τ are disjoint simplices of K. Theorem. Fix integers d,k2 such that d=3k2+1. (a) Assume that P NP. Then there exists a finite k-dimensional complex K that does not admit an almost embedding in Rd but for which there exists an equivariant map K Sd-1. (b) The algorithmic problem of recognition almost embeddability of finite k-dimensional complexes in Rd is NP hard. The proof is based on the technique from the Matousek-Tancer-Wagner paper (proving an analogous result for embeddings), and on singular versions of the higher-dimensional Borromean rings lemma and a generalized van Kampen--Flores theorem.