On the stability radius of a Schur polynomial

Considering the exponential growth of the size of the coefficients of the Schur-Cohn transforms of a polynomial, we define new polynomials proportional to the latter and whose coefficients remain small. These Schur-Cohn sub-transforms replace the Schur-Cohn transforms in the computation of the numbe

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

Motivated by the recent discovery of a simple quantization procedure for Schubert polynomials we study the expansion of Schur and Schubert polynomials into standard elementary monomials (SEM). The SEM expansion of Schur polynomials can be described algebraically by a simple variant of the Jacobi Tru

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