Concommutativity classes generated by matrices with multiple conspectrum (Q1803473)

The class of pseudopermutability \(\Gamma_ H\) generated by the \(n\times n\)-complex matrix \(H\) is the set of matrices \(A\) for which the equality \(\overline AH=HA\) holds. Using the same similarity transformation \(A\to Q^{-1}AQ\) for each element of the class \(\Gamma_ H\) we get another class of pseudopermutability generated by the matrix \(K=\overline Q^{- 1}HQ\). The author shows that if \(K\) is in the so-called pseudoform of Schur with pairwise distinct pseudospectra of its diagonal blocks then each matrix of this class \(\Gamma_ H\) can be transformed -- with the same similarity -- into a special form, the ``quaternary block form'' or can be transformed into a direct sum of two half-size matrices with conjugate spectra.