Right and left Weyl operator matrices in a Banach space setting (Q2230069)

Summary: Let \(\mathscr{X}_i, \mathscr{Y}_i\) (\(i = 1,2\)) be Banach spaces. The operator matrix of the form \(M_C=\begin{bmatrix} A & C \\ 0 & B \end{bmatrix}\) acting between \(\mathscr{X}_1\oplus \mathscr{X}_2\) and \(\mathscr{Y}_1\oplus \mathscr{Y}_2\) is investigated. By using row and column operators, equivalent conditions are obtained for \(M_C\) to be left Weyl, right Weyl, and Weyl for some \(C\in\operatorname{\mathscr{B}}( \mathscr{X}_2, \mathscr{Y}_1)\), respectively. Based on these results, some sufficient conditions are also presented. As applications, some discussions on Hamiltonian operators are given in the context of Hilbert spaces.