A Kharitonov-like theorem for interval polynomial matrices

This article provides a new presentation of Barnett's theorems giving the degree (resp. coefficients) of the greatest common divisor of several univariate polynomials with coefficients in an integral domain by means of the rank (resp. linear dependencies of the columns) of several Bezout-like matric

Woodall, D.R., A zero-free interval for chromatic polynomials, Discrete Mathematics 101 (1992) 333-341. It is proved that, for a wide class of near-triangulations of the plane, the chromatic polynomial has no zeros between 2 and 2.5. Together with a previously known result, this shows that the zero

A well-known theorem by \(\mathrm{N}\). Wiener characterizes the discrete part of a complex Borel measure \(\mu \in \mathbf{M}(T)\) on the torus group \(T\). In this note an analoguous result is presented for orthonormal polynomial sequences \(\left(p_{n}\right)_{n \in n_{0}}\). For Jacobi polynomia