Browder and Weyl spectra of upper triangular operator matrices (Q2853182)

Let \(B(\mathcal X)\) denote the algebra of all bounded linear operators on a Banach space \(\mathcal X\). For \(A,B,C\in B(\mathcal X)\), let \(M_C\) denote the upper triangular operator \(M_C=\big(\begin{smallmatrix} A&C\\0&B\end{smallmatrix}\big)\) and let \(M_0=A\oplus B\). The author characterizes operators \(M_C\) and \(M_0\) satisfying Browder's, or \(a\)-Browder's theorem. The details are too technical to be stated here.