On asymptotic properties of Toeplitz operators (Q2275776)

The authors extend the results of \textit{J. Barria} and \textit{P. R. Halmos} [Trans. Am. Math. Soc. 273, 621--630 (1982; Zbl 0522.47020)] on asymptotic Toeplitz operators for the scalar-valued case to the operators acting on the vector-valued Hardy and Bergman spaces. In particular, for the Hardy space case, they prove that if \(T \in \mathcal{L}(\mathcal{H}^2_{\mathbb{C}^n}(\mathbb{T}))\) and the sequence \(\{T^m_{\theta I_{n \times n}}T\, T^m_{\theta I_{n \times n}}\}\) converges to an operator \(L\) in the strong operator topology for all inner functions \(\theta \in H^{\infty}(\mathbb{T})\), then \(L\) is a Toeplitz operator with matrix-valued \(L^{\infty}\) symbol, and that, if \(T\) belongs to the Hankel operator algebra, then the sequence \(\{T^m_{\theta I_{n \times n}}T\, T^m_{\theta I_{n \times n}}\}\) converges to a Toeplitz operator in the strong operator topology for all inner functions \(\theta \in H^{\infty}(\mathbb{T})\). Some asymptotic properties for the case of the Bergman space are also obtained.