Spaces of embeddings: Nonsingular bilinear maps, chirality, and their generalizations

Abstract

Given a space X we study the topology of the space of embeddings of X into Rd through the combinatorics of triangulations of X. We give a simple combinatorial formula for upper bounds for the largest dimension of a sphere that antipodally maps into the space of embeddings. This result summarizes and extends results about the nonembeddability of complexes into Rd, the nonexistence of nonsingular bilinear maps, and the study of embeddings into Rd up to isotopy, such as the chirality of spatial graphs.