Hardness of almost embedding simplicial complexes in Rd, II

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. Fix integers d,k ≥slant 2 such that k+2 ≤slant d ≤slant3k2+1. Assuming that the "preimage of a cycle is a cycle" we prove NP-hardness of the algorithmic problem of recognition of almost embeddability of finite k-dimensional complexes in Rd. Assuming that P NP (and that the "preimage of a cycle is a cycle") we prove that the embedding obstruction is incomplete for k-dimensional complexes in Rd using configuration spaces. Our proof generalizes the Skopenkov-Tancer proof of this result for d = 3k2 + 1.