Minimal unitary dilations for commuting contractions
Abstract
For commuting contractions T1,… ,Tn acting on a Hilbert space H with T=Πi=1n Ti, we show that (T1, …, Tn) dilates to commuting isometries (V1, … , Vn) on the minimal isometric dilation space of T with V=Πi=1n Vi being the minimal isometric dilation of T if and only if (T1*, … , Tn*) dilates to commuting isometries (Y1, … , Yn) on the minimal isometric dilation space of T* with Y=Πi=1n Yi being the minimal isometric dilation of T*. Then, we prove an analogue of this result for unitary dilations of (T1, … , Tn) and its adjoint. We find a necessary and sufficient condition such that (T1, … , Tn) possesses a unitary dilation (W1, … , Wn) on the minimal unitary dilation space of T with W=Πi=1n Wi being the minimal unitary dilation of T. We show an explicit construction of such a unitary dilation on both Schaffer and Sz. Nagy-Foias minimal unitary dilation spaces of T. Also, we show that a relatively weaker hypothesis is necessary and sufficient for the existence of such a unitary dilation when T is a C.0 contraction, i.e. when T*n → 0 strongly as n → ∞ . We construct a different unitary dilation for (T1, … , Tn) when T is a C.0 contraction.
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