On the stability of quasipolynomials with weighted diamond coefficients

The paper concerns the Hurwitz stability of a family of quasipolynomials with commensurate delays. Each coefficient of the quasipolynomials belongs to a prescribed annulus in the complex plane, and the delay belongs to a prescribed real interval. A computationally tractable robust stability criterio

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

## Abstract On weighted spaces with strictly plurisubharmonic weightfunctions the canonical solution operator of $ {\bar \partial } $ and the $ {\bar \partial } $‐Neumann operator are bounded. In this paper we find a class of strictly plurisubharmonic weightfunctions with certain growth conditions,

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

It is well known that the application of the Mappin, 0 Theorem for determining the stability of characteristic polynomials with multilinear coefficients yields conservative results. We show that if the exposed twodimensional faces of the overbounding polytope, (obtained by enclosing the region repre