Compact Lie groups isolated up to conjugacy

Abstract

The set S(G) of compact subgroups of a Hausdorff topological group G can be equipped with the Vietoris topology. A compact subgroup K∈ S(G) is isolated up to conjugacy if there is a neighborhood U⊂eq S(G) of K such that every L∈ U is conjugate to K. In this paper, we characterize compact subgroups of a Lie group that are isolated up to conjugacy. Our characterization depends only on the intrinsic structure of K, the ambient Lie group G and the embedding of K into G are irrelevant. In addition, we prove that any continuous homomorphism from a compact group G onto a compact Lie group H induces a continuous open map from S(G) onto S(H).