On extended eigenvalues of operators (Q2498068)

A scalar \(\lambda\) is called an extended eigenvalue of an operator \(A\) on a Hilbert space if there exists a nonzero operator \(X\) such that \[ AX=\lambda XA .\tag{1} \] In this paper, the authors make a valuable contribution by considering equation (1) when \(A\) belongs to one of the classes that are related to compact operators: namely, operators on a finite-dimensional space, finite rank operators, Jordan blocks, and \(C_{0}\)-contractions.