On a spectral theorem in paraorthogonality theory

Abstract: Motivated by the works of Genin (1988, 1991), who studied paraorthogonal polynomials associated with positive definite Hermitian linear functionals and their corresponding recurrence relations, we provide paraorthogonality theory, in the context of quasidefinite Hermitian linear functionals, with a recurrence relation and the analogous result to the classical Favard's theorem or spectral theorem. As an application of our results, we prove that for any two monic polynomials whose zeros are simple and strictly … Show more

Poncelet's theorem, paraorthogonal polynomials and the numerical range of compressed multiplication operators

Poncelet's theorem, paraorthogonal polynomials and the numerical range of compressed multiplication operators

Orthogonal polynomials and quadrature rules on the unit circle associated with perturbations of symmetric measures

Zeros of quasi-paraorthogonal polynomials and positive quadrature