Consequences of the existence of ample generics and automorphism groups of homogeneous metric structures

Abstract

We define a simple criterion for a homogeneous, complete metric structure X that implies that the automorphism group Aut(X) satisfies all the main consequences of the existence of ample generics: it has the small index property, the automatic continuity property, and uncountable cofinality for non-open subgroups. Then we verify it for the Urysohn space U, the Lebesgue probability measure algebra MALG, and the Hilbert space 2, thus proving that Iso(U), Aut(MALG), U(2), and O(2) share these properties. We also formulate a condition for X which implies that every homomorphism of Aut(X) into a separable group K with a left-invariant, complete metric, is trivial, and we verify it for U, and 2.