Homogeneity degree of some symmetric products
Abstract
For a metric continuum X, we consider the nth-symmetric product Fn(X) defined as the hyperspace of all nonempty subsets of X with at most n points. The homogeneity degree hd(X) of a continuum X is the number of orbits for the action of the group of homeomorphisms of X onto itself. In this paper we determine hd(Fn(X)) for every manifold without boundary and n∈ N. We also compute hd(Fn[0,1]) for all n∈ N.
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