The moduli space of points in quaternionic projective space

Abstract

Let M(n,m; n) be the configuration space of m-tuples of pairwise distinct points in n, that is, the quotient of the set of m-tuples of pairwise distinct points in n with respect to the diagonal action of PU(1,n;) equipped with the quotient topology. It is an important problem in hyperbolic geometry to parameterize M(n,m; n) and study the geometric and topological structures on the associated parameter space. In this paper, by mainly using the rotation-normalized and block-normalized algorithms, we construct the parameter spaces of both M(n,m; ) and M(n,m;(V+)), respectively.