The space of clouds in an Euclidean space

Abstract

We study the space md of clouds in d (ordered sets of m points modulo the action of the group of affine isometries). We show that md is a smooth space, stratified over a certain hyperplane arrangement in m. We give an algorithm to list all the chambers and other strata (this is independent of d). With the help of a computer, we obtain the list of all the chambers for m≤ 9 and all the strata when m≤ 8. As the strata are the product of a polygon spaces with a disk, this gives a classification of m-gon spaces for m≤ 9. When d=2,3, m=5,6,7 and modulo reordering, we show that the chambers (and so the different generic polygon spaces) are distinguished by the ring structure of their mod 2-cohomology.

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