Equivariant means
Abstract
An n-mean (also called a ''topological social choice rule'') on a topological space X is a continuous function p:Xn X satisfying p(x,…, x)=x for every x∈ X and p(x1,…, xn)=p(xσ(1),… xσ(n)) for any permutation σ of \1,…, n\. If, in addition, X is a G-space and p is equivariant with respect to the diagonal action of G on Xn, we say that p is an equivariant n-mean. In this paper, we continue the work initiated by H. Ju\'arez-Anguiano about conditions on a G-space X, under which the existence of an equivariant n-mean guarantees that X is a G-AR. We also explore this problem when we remove the symmetry condition on the definition of an n-mean.
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