The space of transversals through the space of configurations
by
Deborah Oliveros
University of Calgary
Coauthors: Montejano Luis

Abstract

Let F={A⁰, A¹, ..., A^r} be a family of convex sets in Rⁿ. The space of m-transversals of F, denoted T_m(F), is the subspace of the Grassmannian G^*(n, m) of (free) m-planes in Rⁿ that intersect all the members of F.

The purpose of this talk is to study the topology of T_m(F) through C_r^m, the polyhedron of configurations of (r+1)-points in R^m; where such a configuration is the affine equivalence class of (r+1)-ordered points in R^m that affinely generate it. The configuration space has a natural polyhedral structure with faces corresponding to what has been called order types. In particular, if r=m+1 and T_m-1(F) is empty, we shall prove that the homotopy type of T_m(F) is ruled by the set of all possible order types achieved by the m-transversals of F. We shall also prove that the set of all m-transversals in T_m(F) that intersect F

Date received: August 27, 2002