Zeros of para–orthogonal polynomials and linear spectral transformations on the unit circle

Abstract: 1 4 . DO I : 1 0 . 1 0 0 7 / s 1 1 0 7 5 -0 1 5 -0 0 1 7 -3 © S p r i n g e r 2 0 1 6 P r o y e c t o s : P E s t -C /M A T /U I 0 3 2 4 / 2 0 1 3 S F RH / B PD / 1 0 1 1 3 9 / 2 0 1 4 4 7 0 0 1 9 / 2 0 1 3 -1 M TM 2 0 1 2 -3 6 7 3 2 -C 0 3 -0 1 1 0 7 / 2 0 1 2 Z e r o s o f p a r a -o r t h o g o n a l p o l y n om i a l s a n d l i n e a r s p e c t r a l t r a n s f o rm a t i o n s o n t h e u n i t c i r c l e o c i a t e d w i t h a n o n t r i v i a l p r o b a b i l i t y m e a s u r e s u p p o r t e… Show more

“…Invariant polynomials, orthogonal to this subspace for = 0 were coined paraorthogonal as they were introduced in [34], (see also [28, Theorem III]), and they were later studied by many [22,23,12,13,15,14,31,51,36,38]. We shall refer to them as quasi-paraorthogonal polynomials (QPOPUC) of order 1.…”

“…This problem has a matrix interpretation, that extends the case = 1. Let us assume that there exists a unique solution P for the system (15) and that it is given by P…”

Zeros of quasi-paraorthogonal polynomials and positive quadrature

“…Invariant polynomials, orthogonal to this subspace for = 0 were coined paraorthogonal as they were introduced in [34], (see also [28, Theorem III]), and they were later studied by many [22,23,12,13,15,14,31,51,36,38]. We shall refer to them as quasi-paraorthogonal polynomials (QPOPUC) of order 1.…”

“…This problem has a matrix interpretation, that extends the case = 1. Let us assume that there exists a unique solution P for the system (15) and that it is given by P…”

Zeros of quasi-paraorthogonal polynomials and positive quadrature

“…The definition goes back to Delsarte-Genin [19] and Jones et. al [45]; among later papers, we mention [7,9,10,11,18,34,58,63,75]. One can show that the n + 1 point measure, dν λ , whose first n Verblunsky coefficients are the first n α j and with α n = λ has Φ n+1 (z; λ) as its n+1st monic OPUC (which has norm 0!).…”

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

“…It is known that an arbitrary polynomial with simple zeros on ‫ބ∂‬ is a POPUC with respect to some nontrivial probability measure supported on ‫ބ∂‬ [Castillo et al 2015]. Since n (β n ) = 0 and n+1 (β n ) = 0, and we are interested in the zeros, there is no loss of generality if we assume that…”

On a spectral theorem in paraorthogonality theory