Norm estimates of the Fourier series coefficients of the matrix resolvent (Q2484590)

The resolvent over the unit circle of a martix \(A\in {\mathbb C}^{n\times n}\) can be decomposed in a general form of a Fourier series. This note shows that the Fourier coefficients \((Z_k)_{k\in {\mathbb Z}}\) decrease to zero with a rate depending essentially on the norm of the solution of the descrete-time Lyapunov equation applied to~\(A\). Analoguos estimates for the powers of~\(A\) were obtained by \textit{M. Sadkane} [Appl. Math. Lett. 16, No. 3, 313--316 (2003; Zbl 1068.93047)].