Abstract
This is a review of the current state of the theory of introduced by the author in 1977. It starts with a definition of for a set of $k$ points in $m$ dimensions. The first task is to identify the shape spaces in which such objects naturally live, and then to examine the probability structures induced on such a shape space by corresponding structures in $\mathbf{R}^m$. Against this theoretical background one formulates and solves statistical problems concerned with shape characteristics of empirical sets of points. Some applications (briefly sketched here) are to archeology, astronomy, geography and physical chemistry. We also outline more recent work on size-and-shape, on shapes of sets of points in riemannian spaces, and on shape-theoretic aspects of random Delaunay tessellations.
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