Generalized bundle shift with application to multiplication operator on the Bergman space (Q2835223)

Let \(B\) be a finite Blaschke product of order \(n\). Set \(\mathcal S=B(\{\beta\in D; B'(\beta)\neq 0\})\), where \(D\) is the unit disk, and, for each flat unitary vector bundle \(E\), let \(T_E\) stand for the multiplication operator over \(L_a^2(E)\). Finally, let \(E_B\) be the flat unitary vector bundle over \(D\setminus \mathcal S\) determined by \(B\).NEWLINENEWLINE The following is the main result of this paper.NEWLINENEWLINETheorem. Let \(T_B\) stand for the multiplication operator on \(L_a^2(D)\) by \(B\) and \(T_{E_B}\) be the multiplication operator on \(L_a^2(E_B)\) defined by \(z\). Then \(T_B\) is unitarily equivalent to \(T_{E_B}\).NEWLINENEWLINEFurther aspects involving these notions are also discussed.