We present a Hilbert space geometric approach to the problem of characterizing the positive bivariate trigonometric polynomials that can be represented as the square of a two variable polynomial possessing a certain stability requirement, namely no zeros on a face of the bidisk. Two different characterizations are given using a Hilbert space structure naturally associated to the trigonometric polynomial; one is in terms of a certain orthogonal decomposition the Hilbert space must possess called the “split-shift orthogonality condition” and another is an operator theoretic or matrix condition closely related to an earlier characterization due to the first two authors. This approach allows several refinements of the characterization and it al...
AbstractIn the theory of polynomials orthogonal with respect to an inner product of the form 〈f,〉 = ...
AbstractA real polynomial is (asymptotically) stable when all of its zeros lie in the open left half...
AbstractA classical approach used to obtain basic facts in the theory of square matrices involves an...
We prove a detailed sums of squares formula for two-variable polynomials with no zeros on the bidisk...
Review of Scientific Instruments, 78(11): pp. 796–825.We consider bivariate polynomials orthogonal o...
AbstractLet D and E be two real intervals. We consider transformations that map polynomials with zer...
Schur complements provide a convenient tool for proving the operator valued version of the classical...
AbstractFormulas of Christoffel and Uvarov for changing the weight of real orthogonal polynomials by...
AbstractIn recent years, good algorithms have been developed for finding the zeros of trigonometric ...
AbstractIn this paper we study polynomials (Pn) which are hermitian orthogonal on two arcs of the un...
AbstractIn this paper, we shall follow a companion matrix approach to study the relationship between...
The cones of nonnegative polynomials and sums of squares arise as central objects in convex algebrai...
This thesis is devoted to the analysis of multiple orthogonal polynomials for indices on the so-call...
In this paper we treat the two-variable positive extension problem for trigonometric polynomials whe...
Frequently, in control system design, we are asked to locate the roots of a bivariate polynomial ...
AbstractIn the theory of polynomials orthogonal with respect to an inner product of the form 〈f,〉 = ...
AbstractA real polynomial is (asymptotically) stable when all of its zeros lie in the open left half...
AbstractA classical approach used to obtain basic facts in the theory of square matrices involves an...
We prove a detailed sums of squares formula for two-variable polynomials with no zeros on the bidisk...
Review of Scientific Instruments, 78(11): pp. 796–825.We consider bivariate polynomials orthogonal o...
AbstractLet D and E be two real intervals. We consider transformations that map polynomials with zer...
Schur complements provide a convenient tool for proving the operator valued version of the classical...
AbstractFormulas of Christoffel and Uvarov for changing the weight of real orthogonal polynomials by...
AbstractIn recent years, good algorithms have been developed for finding the zeros of trigonometric ...
AbstractIn this paper we study polynomials (Pn) which are hermitian orthogonal on two arcs of the un...
AbstractIn this paper, we shall follow a companion matrix approach to study the relationship between...
The cones of nonnegative polynomials and sums of squares arise as central objects in convex algebrai...
This thesis is devoted to the analysis of multiple orthogonal polynomials for indices on the so-call...
In this paper we treat the two-variable positive extension problem for trigonometric polynomials whe...
Frequently, in control system design, we are asked to locate the roots of a bivariate polynomial ...
AbstractIn the theory of polynomials orthogonal with respect to an inner product of the form 〈f,〉 = ...
AbstractA real polynomial is (asymptotically) stable when all of its zeros lie in the open left half...
AbstractA classical approach used to obtain basic facts in the theory of square matrices involves an...