The Moduli Space of Points in the Boundary of Quaternionic Hyperbolic Space
Abstract
Let F1(n,m) be the space of ordered m-tuples of pairwise distinct points in ∂ HHn up to its isometry group PSp(n,1). It is a real 2m2-6m+5-Σm-n-1i=1m-2 n-1+i dimensional algebraic variety when m>n+1. In this paper, we construct and describe the moduli space of F1(n,m), in terms of the Cartan's angle and cross-ratio invariants, by applying the Moore's determinant.
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