We study the relationships between a subvariety of the open unit ball in the complex d-dimensional space C^d, the reproducing kernel Hilbert space (RKHS) obtained by restricting the Drury-Arveson space to the variety, and its multiplier algebra.

Davidson, Ramsey, and Shalit showed that given two subvarieties, one is the image of the other under an automorphism of the ball if and only if the RKHSs corresponding to the varieties are isometrically isomorphic as RKHSs, and this holds if and only if their multiplier algebras are isometrically isomorphic as multiplier algebras.

We demonstrate that whenever two such RKHSs are close to being isometrically isomorphic, their multiplier algebras are close to being isometrically isomorphic as well. In this case, the underlying varieties are close to being automorphically equivalent. For homogeneous varieties satisfying some additional conditions, we show that if one variety is close to being the image of the other under a unitary, then the RKHSs are close to being isometrically isomorphic as RKHSs.