Embeddings of k-complexes in 2k-manifolds and minimum rank of partial symmetric matrices

Abstract

Let K be a k-dimensional simplicial complex having n faces of dimension k, and M a closed (k-1)-connected PL 2k-dimensional manifold. We prove that for k3 odd K embeds into M if and only if there are a skew-symmetric n× n-matrix A with integer entries, whose rank over Q does not exceed rk Hk(M; Z), a general position PL map f:K R2k, and orientations on k-faces of K such that for any nonadjacent k-faces σ,τ of K the entry Aσ,τ equals to the algebraic intersection of fσ and fτ. We prove some analogues of this result (for any parity of k), including those for Z2- and Z-embeddability. Our results generalize the Bikeev-Fulek-Kyn cl criteria for the Z2- and Z-embeddability of graphs to surfaces, and are related to the Harris-Krushkal-Johnson-Paták-Tancer criteria for the embeddability of k-complexes into 2k-manifolds. The main novelty of this paper is passing from the cohomology condition of Paták-Tancer to the simpler extendability of some intersection function to a low-rank matrix (defined in the paper using the idea of Fulek-Kyn cl).