Quasi-radial operators on the weighted Bergman space over the unit ball (Q2517049)

Toeplitz operators on the weighted Bergman space on the unit ball \(\mathbb B^{n}\) in \(\mathbb C^{n}\) are investigated. Let \(\mathbf k=(k_{1},k_{2},\dots,k_{m})\) be a tuple such that all \(k_{i}\in \mathbb N\) and \(\sum_{i=1}^{m}k_{i}=n\). Block diagonal matrices with \(k_{i}\times k_{i}\) unitary diagonal blocks are introduced. For such a matrix \(U\), let \(V_{U}\) be the operator acting on the Bergman space by the formula \((V_{U}f)(z)=f(Uz)\), \(z\in\mathbb B^{n}\). A linear bounded operator \(S\) is called \(\mathbf k\)-quasi-radial if \(SV_{U}=V_{U}S\) for all matrices \(U\) of the structure given above. These operators form an intermediate class between the Toeplitz operators with the symbols of the following two types: \(a(\sqrt{|z|_{1}^{2},\dots,|z|_{n}^{2}})\) and \(a(|z_{1}|,\dots,|z_{n}|)\). Some properties of these operators are investigated.