An algorithmic discrete gradient field for non-colliding cell-like objects and the topology of pairs of points on skeleta of simplexes

Abstract

For a positive integer n and a finite simplicial complex K, we describe an algorithmic procedure constructing a maximal discrete gradient field W(K,n) on Abrams' discretized configuration space DConf(K,n). Computer experimentation shows that the field is generically optimal. We study the field W(K,n) for n=2 and K=m,d, the d-dimensional skeleton of the m-dimensional simplex. In particular, we prove that DConf(m,d,2) is (\d,m-1\-1)-connected, has torsion-free homology and admits a minimal cell structure. We compute the Betti numbers of DConf(m,d,2) and, for certain values of d, we prove that DConf(m,d,2) breaks, up to homotopy, as a wedge of (not necessarily equidimensional) spheres.