On transitive and homogeneous binary G-spaces
Abstract
In this paper, the notions of transitivity and homogeneity in binary G-spaces are studied. These notions coincide for distributive binary G-spaces. For compact G, it is shown that distributive transitive binary G-spaces are coset spaces with a suitably defined binary G-action. Homogeneous binary G-spaces are topologically homogeneous and are separated into distinct stabilization types. Examples of each type are constructed.
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