Counterexample and correction to a recent result on robust stability of a diamond of complex polynomials

In Ref. (1) , Schur stability of a family of polynomials with transformed coefficients varying in a diamond has been studied. A necessary and sufficient condition was given for the stability of the entire family if a selected set of eight edge polynomials was stable. In this paper, we show via a co

In apreviouspaper (Yen and Zhou, J. Franklin Inst. 1996), Schur stability ofa family of polynomials with transformed coefficients varying in a diamond was studied. A necessary ad suj3cient condition was given for the stability of the entire family ij" a selected set of 16 (for even n) or 32 (for odd

Strict Schur property of' a complex-co@icient ,family of polynomials uxith the transformed coe@cients varying in a diamond is considered. It is proved that the checking of eight edge polynomials provides necessary and s@cient conditions for the strict Schur property of the transformed .family of per