Uniform Continuity and Quantization on Bounded Symmetric Domains

Abstract

We consider Toeplitz operators Tfλ with symbol f acting on the standard weighted Bergman spaces over a bounded symmetric domain ⊂ Cn. Here λ > genus-1 is the weight parameter. The classical asymptotic semi-commutator relation λ → ∞ \|Tfλ Tgλ -Tfgλ \|=0 with f,g ∈ C(Bn), where =Bn denotes the complex unit ball, is extended to larger classes of bounded and unbounded operator symbol-functions and to more general domains. We deal with operator symbols that generically are neither continuous inside (Section 4) nor admit a continuous extension to the boundary (Section 3 and 4). Let β denote the Bergman metric distance function on . We prove that the semi-commutator relation remains true for f and g in the space UC() of all β-uniformly continuous functions on . Note that this space contains also unbounded functions. In case of the complex unit ball =Bn ⊂ Cn we show that the semi-commutator relation holds true for bounded symbols in VMO(Bn), where the vanishing oscillation inside Bn is measured with respect to β. At the same time the semi-commutator relation fails for generic bounded measurable symbols. We construct a corresponding counterexample using oscillating symbols that are continuous outside of a single point in .