The topology of spaces of polygons

Abstract

Let Ed() denote the space of all closed n-gons in d (where d 2) with sides of length 1,..., n, viewed up to translations. The spaces Ed() are parameterized by their length vectors =(1,..., n)∈ n> encoding the length parameters. Generically, Ed() is a closed smooth manifold of dimension (n-1)(d-1)-1 supporting an obvious action of the orthogonal group O(d). However, the quotient space Ed()/O(d) (the moduli space of shapes of n-gons) has singularities for a generic , assuming that d>3; this quotient is well understood in the low dimensional cases d=2 and d=3. Our main result in this paper states that for fixed d 3 and n 3, the diffeomorphism types of the manifolds Ed() for varying generic vectors are in one-to-one correspondence with some combinatorial objects -- connected components of the complement of a finite collection of hyperplanes. This result is in the spirit of a conjecture of K. Walker who raised a similar problem in the planar case d=2.