Properties of reproducing kernel Hilbert spaces of a group action

Abstract

In this paper, we investigate properties of a reproducing kernel Hilbert space of a group action. In particular, we introduce an equivalence relation on a compact Hausdorff space X, and consequently establish three equivalent definitions for when two elements are related. We also see how the equivalence classes of X correspond to subgroups of the group acting transitively on X, which we aptly refer to as relation stabilizers.

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