Dilation distance and the stability of ergodic commutation relations

Abstract

We revisit and generalize the notion of dilation distance dD(u,v) between unitary tuples and study its relation to the natural Haagerup-Rrdam distance dHR(u,v) = ∈f\\|π(u) - (v)\|\, where the infimum is taken over all pairs of faithful representations π C*(u) B(H), C*(v) B(H). We show that dHR(u,v)≤ 10drD(u,v)1/2, where drD(u,v) is a relaxed dilation distance, improving and extending earlier results. For an antisymmetric matrix , we show via a concrete dilation construction that a tuple of unitaries u that almost commutes according to (i.e., \|u uk - ei θk, uk u\| is small) can be nearly dilated to a tuple of unitaries v that commutes according to (i.e., v vk - ei θk, vk v = 0). We show that the dilation can be "reversed" by a second application of the dilation construction, which leads to a rotated version of the original tuple. Thus, a gauge invariant almost -commuting unitary tuple can be approximated (in some faithful representation) by a -commuting unitary tuple. Moreover, when is ergodic, a -commuting tuple is shown to be almost gauge invariant, and it follows from the results above that these can be approximated in norm by -commuting tuples. In particular, we obtain the following counterpart of Lin's theorem on almost commuting unitaries: if q ∈ T is not a root of unity, then for every >0 there exists δ > 0 such that for every pair of unitaries u1,u2 ∈ B(H) for which \|u1 u2 - qu2 u1\| < δ, there exists two q-commuting unitaries v1, v2 ∈ B(H 2) such that \|vi - ui 1\| < (i=1,2).