On generalized configuration space and its homotopy groups

Abstract

Let M be a subset of vector space or projective space. The authors define the generalized configuration space of M which is formed by n-tuples of elements of M where any k elements of each n-tuple are linearly independent. The generalized configuration space gives a generalization of the classical configuration space defined by E.Fadell. Denote the generalized configuration space of M by Wk,n(M). The authors are mainly interested in the calculation about the homotopy groups of generalized configuration space. This article gives the fundamental groups of generalized configuration spaces of RPm for some special cases, and the connections between the homotopy groups of generalized configuration spaces of Sm and the homotopy groups of Stiefel manifolds. It is also proved that the higher homotopy groups of generalized configuration spaces Wk,n(Sm) and Wk,n(RPm) are isomorphic.